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6x9 Handbook / Electronic Filter Design / Williams & Taylor /147171-5 / Chapter 1
Source: ELECTRONIC FILTER DESIGN HANDBOOK
CHAPTER 1
INTRODUCTION TO MODERN NETWORK THEORY
1.1 MODERN NETWORK THEORY A generalized filter is shown in Figure 1-1. The filter block may consist of inductors, capacitors, resistors, and possibly active elements such as operational amplifiers and transistors. The terminations shown are a voltage source Es, a source resistance Rs, and a load resistor RL. The circuit equations for the network of Figure 1-1 can be written by using circuitanalysis techniques. Modern network theory solves these equations to determine the network values for optimum performance in some respect.
The Pole-Zero Concept The frequency response of the generalized filter can be expressed as a ratio of two polynomials in s where s jv ( j !1, and v, the frequency in radians per second, is 2pf ) and is referred to as a transfer function. This can be stated mathematically as T(s)
EL N(s) Es D(s)
(1-1)
The roots of the denominator polynomial D(s) are called poles and the roots of the numerator polynomial N(s) are referred to as zeros. Deriving a network’s transfer function could become quite tedious and is beyond the scope of this book. The following discussion explores the evaluation and representation of a relatively simple transfer function. Analysis of the low-pass filter of Figure 1-2a results in the following transfer function: T(s)
1 s 3 2s 2 2s 1
(1-2)
FIGURE 1-1 A generalized filter.
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INTRODUCTION TO MODERN NETWORK THEORY 2
CHAPTER ONE
FIGURE 1-2 An all-pole n 3 low-pass filter: (a) a filter circuit; and (b) a frequency response.
Let us now evaluate this expression at different frequencies after substituting jv for s. The result will be expressed as the absolute magnitude of T( jv) and the relative attention in decibels with respect to the response at DC. T( jv)
1 1 2v2 j(2v v3)
v
ZT( jv) Z
20 log ZT( jv) Z
0 1 2 3 4
1 0.707 0.124 0.0370 0.0156
0 dB 3 dB 18 dB 29 dB 36 dB
(1-3)
The frequency-response curve is plotted in Figure 1-2b. Analysis of Equation (1-2) indicates that the denominator of the transfer function has three roots or poles and the numerator has none. The filter is therefore called an all-pole type. Since the denominator is a third-order polynomial, the filter is also said to have an n 3 complexity. The denominator poles are s 1, s 0.500 j0.866, and s 0.500 j0.866. These complex numbers can be represented as symbols on a complex-number plane. The abscissa is a, the real component of the root, and the ordinate is b, the imaginary part. Each pole is represented as the symbol X, and a zero is represented as 0. Figure 1-3 illustrates the complex-number plane representation for the roots of Equation (1-2). Certain mathematical restrictions must be applied regarding the location of poles and zeros in order for the filter to be realizable. They must occur in pairs which are conjugates of each other, except for real-axis poles and zeros, which may occur singly. Poles must also be restricted to the left plane (in other words, the real coordinate of the pole must be negative), while zeros may occur in either plane. Synthesis of Filters from Polynomials. Modern network theory has produced families of standard transfer functions that provide optimum filter performance in some desired respect. Synthesis is the process of deriving circuit component values from these transfer functions. Chapter 11 contains extensive tables of transfer functions and their associated component values so that design by synthesis is not required. Also, computer programs on the CD-ROM simplify the design process. However, in order to gain some understanding
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INTRODUCTION TO MODERN NETWORK THEORY INTRODUCTION TO MODERN NETWORK THEORY
3
FIGURE 1-3 A complex-frequency plane representation of Equation (1-2).
as to how these values have been determined, we will now discuss a few methods of filter synthesis. Synthesis by Expansion of Driving-Point Impedance. The input impedance to the generalized filter of Figure 1-1 is the impedance seen looking into terminals 1 and 2 with terminals 3 and 4 terminated, and is referred to as the driving-point impedance or Z11 of the network. If an expression for Z11 could be determined from the given transfer function, this expression could then be expanded to define the filter. A family of transfer functions describing the flattest possible shape and a monotonically increasing attenuation in the stopband is known as the Butterworth low-pass response. These all-pole transfer functions have denominator polynomial roots, which fall on a circle having a radius of unity from the origin of the jv axis. The attenuation for this family is 3 dB at 1 rad/s. The transfer function of Equation (1-2) satisfies this criterion. It is evident from Figure 1-3 that if a circle were drawn having a radius of 1, with the origin as the center, it would intersect the real root and both complex roots. If Rs in the generalized filter of Figure 1-1 is set to 1 , a driving-point impedance expression can be derived in terms of the Butterworth transfer function as Z11
D(s) s n D(s) s n
(1-4)
where D(s) is the denominator polynomial of the transfer function and n is the order of the polynomial. After D(s) is substituted into Equation (1-4), Z11 is expanded using the continued fraction expansion. This expansion involves successive division and inversion of a ratio of two polynomials. The final form contains a sequence of terms, each alternately representing a capacitor and an inductor and finally the resistive termination. This procedure is demonstrated by the following example. Example 1-1 Synthesis of N 3 Butterworth Low-Pass Filter by Continued Fraction Expansion Required:
A low-pass LC filter having a Butterworth n 3 response.
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6x9 Handbook / Electronic Filter Design / Williams & Taylor /147171-5 / Chapter 1
INTRODUCTION TO MODERN NETWORK THEORY 4
CHAPTER ONE Result:
(a) Use the Butterworth transfer function: T(s)
1 s 3 2s 2 2s 1
(1-2)
(b) Substitute D(s) s3 2s2 2s 1 and sn s3 into Equation (1-4), which results in Z11
2s 2 2s 1 2s 2s 2 2s 1 3
(1-4)
(c) Express Z11 so that the denominator is a ratio of the higher-order to the lower-order polynomial: Z11
1 2s 3 2s 2 2s 1 2s 2 2s 1
(d) Dividing the denominator and inverting the remainder results in
Z11
1 s
1 2s 2 2s 1 s1
(e) After further division and inversion, we get as our final expression: Z11
1 s
1 2s
(1-5)
1 s1
The circuit configuration of Figure 1-4 is called a ladder network, since it consists of alternating series and shunt branches. The input impedance can be expressed as the following continued fraction:
Z11
1 Y1
1 Z2
(1-6)
1 1 c Y3 1 Zn1 Yn
where Y sC and Z sL for the low-pass all-pole ladder except for a resistive termination where Yn sC 1/RL.
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6x9 Handbook / Electronic Filter Design / Williams & Taylor /147171-5 / Chapter 1
INTRODUCTION TO MODERN NETWORK THEORY INTRODUCTION TO MODERN NETWORK THEORY
5
FIGURE 1-4 A general ladder network.
Figure 1-5 can then be derived from Equation (1-5) and (1-6) by inspection. This can be proved by reversing the process of expanding Z11. By alternately adding admittances and impedances while working toward the input, Z11 is verified as being equal to Equation (1-5). Synthesis for Unequal Terminations. If the source resistor is set equal to 1 and the load resistor is desired to be infinite (unterminated), the impedance looking into terminals 1 and 2 of the generalized filter of Figure 1-1 can be expressed as Z11
D(s even) D(s odd)
(1-7)
D(s even) contains all the even-power s terms of the denominator polynomial and D(s odd) consist of all the odd-power s terms of any realizable all-pole low-pass transfer function. Z11 is expanded into a continued fraction, as in Example 1-1, to define the circuit. Example 1-2 Termination
Synthesis of N 3 Butterworth Low-Pass Filter for an Infinite
Required:
Low-pass filter having a Butterworth n 3 response with a source resistance of 1 and an infinite termination.
FIGURE 1-5 The low-pass filter for Equation (1-5).
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INTRODUCTION TO MODERN NETWORK THEORY 6
CHAPTER ONE Result:
(a) Use the Butterworth transfer function: T(s)
1 s 3 2s 2 2s 1
(1-2)
(b) Substitute D(s even) 2s2 1 and D(s odd) s3 2s into Equation (1-7): 2s 2 1 s 3 2s
Z11
(1-7)
(c) Express Z11 so that the denominator is a ratio of the higher- to the lower-order polynomial: 1 Z11 3 s 2s 2s 2 1 (d) Dividing the denominator and inverting the remainder results in Z11
1
1 2s 2 1 1.5s (e) Dividing and further inverting results in the final continued fraction: Z11
0.5s
1 0.5s
(1-8)
1 1.333s
1 1.5s
The circuit is shown in Figure 1-6. Synthesis by Equating Coefficients. An active three-pole low-pass filter is shown in Figure 1-7. Its transfer function is given by T(s) where
and
1 s 3A s 2B sC 1
(1-9)
A C1C2C3
(1-10)
B 2C3(C1 C2)
(1-11)
C C2 3C3
(1-12)
FIGURE 1-6 The low-pass filter of Example 1-2.
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FIGURE 1-7 The general n 3 active low-pass filter.
If a Butterworth transfer function is desired, we can set Equation (1-9) equal to Equation (1-2). T(s)
1 1 3 s 3A s 2B sC 1 s 2s 2 2s 1
(1-13)
By equating coefficients, we obtain A1 B2 C2 Substituting these coefficients in Equation (1-10) through (1-12) and solving for C1, C2, and C3 results in the circuit of Figure 1-8. Synthesis of filters directly from polynomials offers an elegant solution to filter design. However, it also may involve laborious computations to determine circuit element values. Design methods have been greatly simplified by the curves, tables, computer programs, and step-by-step procedures provided in this handbook, so design by synthesis can be left to the advanced specialist. Active vs. Passive Filters. The LC filters of Figures 1-5 and 1-6 and the active filter of Figure 1-8 all satisfy an n 3 Butterworth low-pass transfer function. The filter designer is frequently faced with the sometimes difficult decision of choosing whether to use an active or LC design. A number of factors must be considered. Some of the limitations and considerations for each filter type will now be discussed. Frequency Limitations. At subaudio frequencies, LC filter designs require high values of inductance and capacitance along with their associated bulk. Active filters are more practical because they can be designed at higher impedance levels so that capacitor magnitudes are reduced. Above 20 MHz or so, most commercial-grade operational amplifiers have insufficient open-loop gain for the average active filter requirement. However, amplifiers are available
FIGURE 1-8 A Butterworth n 3 active low-pass filter.
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INTRODUCTION TO MODERN NETWORK THEORY 8
CHAPTER ONE
with extended bandwidth at an increased cost so that active filters at frequencies up to 100 MHz are possible. LC filters, on the other hand, are practical at frequencies up to a few hundred megahertz. Beyond this range, filters become impractical to build in lumped form, and so distributed parameter techniques are used, such as stripline or microstrip, where a PC board functions as a distributed transmission line. Size Considerations. Active filters are generally smaller than their LC counterparts since inductors are not required. Further reduction in size is possible with microelectronic technology. Surface mount components for the most part have replaced Hybrid technology, whereas in the past Hybrids were the only way to reduce the size of active filters. Economics and Ease of Manufacture. LC filters generally cost more than active filters because they use inductors. High-quality coils require efficient magnetic cores. Sometimes, special coil-winding methods are needed as well. These factors lead to the increased cost of LC filters. Active filters have the distinct advantage that they can be easily assembled using standard off-the-shelf components. LC filters require coil-winding and coil-assembly skills. In addition, eliminating inductors prevents magnetic emissions, which can be troublesome. Ease of Adjustment. In critical LC filters, tuned circuits require adjustment to specific resonances. Capacitors cannot be made variable unless they are below a few hundred picofarads. Inductors, however, can easily be adjusted, since most coil structures provide a means for tuning, such as an adjustment slug for a Ferrite potcore. Many active filter circuits are not easily adjustable, however. They may contain RC sections where two or more resistors in each section have to be varied in order to control resonance. These types of circuit configurations are avoided. The active filter design techniques presented in this handbook include convenient methods for adjusting resonances where required, such as for narrowband bandpass filters.
BIBLIOGRAPHY Guillemin, E. A. (1957). Introduction to Circuit Theory. New York: John Wiley and Sons. Stewart, J. L. (1956). Circuit Theory and Design. New York: John Wiley and Sons. White Electromagnetics. (1963). A Handbook on Electrical Filters. White Electromagnetics, Inc.
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6x9 Handbook / Electronic Filter Design / Williams & Taylor /147171-5 / Chapter 2
Source: ELECTRONIC FILTER DESIGN HANDBOOK
CHAPTER 2
SELECTING THE RESPONSE CHARACTERISTIC
2.1 FREQUENCY-RESPONSE NORMALIZATION Several parameters are used to characterize a filter’s performance. The most commonly specified requirement is frequency response. When given a frequency-response specification, the engineer must select a filter design that meets these requirements. This is accomplished by transforming the required response to a normalized low-pass specification having a cutoff of 1 rad/s. This normalized response is compared with curves of normalized low-pass filters which also have a 1-rad/s cutoff. After a satisfactory low-pass filter is determined from the curves, the tabulated normalized element values of the chosen filter are transformed or denormalized to the final design. Modern network theory has provided us with many different shapes of amplitude versus frequency which have been analytically derived by placing various restrictions on transfer functions. The major categories of these low-pass responses are • • • • • •
Butterworth Chebyshev Linear Phase Transitional Synchronously tuned Elliptic-function
With the exception of the elliptic-function family, these responses are all normalized to a 3-dB cutoff of 1 rad/s. Frequency and Impedance Scaling The basis for normalization of filters is the fact that a given filter’s response can be scaled (shifted) to a different frequency range by dividing the reactive elements by a frequencyscaling factor (FSF). The FSF is the ratio of a reference frequency of the desired response to the corresponding reference frequency of the given filter. Usually 3-dB points are selected as reference frequencies of low-pass and high-pass filters, and the center frequency is chosen as the reference for bandpass filters. The FSF can be expressed as FSF
desired reference frequency existing reference frequency
(2-1)
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CHAPTER TWO
The FSF must be a dimensionless number; so both the numerator and denominator of Equation (2-1) must be expressed in the same units, usually radians per second. The following example demonstrates the computation of the FSF and frequency scaling of filters. Example 2-1
Frequency Scaling of a Low-Pass Filter
Required:
A low-pass filter, either LC or active, with an n 3 Butterworth transfer function having a 3-dB cutoff at 1000 Hz. Result:
Figure 2-1 illustrates the LC and active n 3 Butterworth low-pass filters discussed in Chapter 1 and their response. (a) Compute FSF. FSF
2p1000 rad/s 6280 1 rad/s
(2-1)
(b) Dividing all the reactive elements by the FSF results in the filters of Figure 2-2a and b and the response of Figure 2-2c. Note that all points on the frequency axis of the normalized response have been multiplied by the FSF. Also, since the normalized filter has its cutoff at 1 rad/s, the FSF can be directly expressed by 2pfc, where fc is the desired low-pass cutoff frequency in hertz. Frequency scaling a filter has the effect of multiplying all points on the frequency axis of the response curve by the FSF. Therefore, a normalized response curve can be directly used to predict the attenuation of the denormalized filter.
FIGURE 2-1 n 3 Butterworth low-pass filter: (a) LC filter; (b) active filter; and (c) frequency response.
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11
FIGURE 2-2 The denormalized low-pass filter of Example 2-1: (a) LC filter; (b) active filter; and (c) frequency response.
When the filters of Figure 2-1 were denormalized to those of Figure 2-2, the transfer function changed as well. The denormalized transfer function became 1 T(s) (2-2) 4.03 1012s 3 5.08 109s 2 3.18 104s 1 The denominator has roots: s 6280, s 3140 j5438, and s 3140 j5438. These roots can be obtained directly from the normalized roots by multiplying the normalized root coordinates by the FSF. Frequency scaling a filter also scales the poles and zeros (if any) by the same factor. The component values of the filters in Figure 2-2 are not very practical. The capacitor values are much too large and the 1- resistor values are not very desirable. This situation can be resolved by impedance scaling. Any linear active or passive network maintains its transfer function if all resistor and inductor values are multiplied by an impedance-scaling factor Z, and all capacitors are divided by the same factor Z. This occurs because the Zs cancel in the transfer function. To prove this, let’s investigate the transfer function of the simple two-pole low-pass filter of Figure 2-3a, which is 1 (2-3) T(s) 2 s LC sCR 1 Impedance scaling can be mathematically expressed as Rr ZR
(2-4)
Lr ZL C Cr Z
(2-5) (2-6)
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CHAPTER TWO
FIGURE 2-3 A two-pole low-pass LC filter: (a) a basic filter; and (b) an impedance-scaled filter.
If we impedance-scale the filter, we obtain the circuit of Figure 2-3b. The new transfer function then becomes T(s)
1 C C s ZL s ZR 1 Z Z
(2-7)
2
Clearly, the Zs cancel, so both transfer functions are equivalent. We can now use impedance scaling to make the values in the filters of Figure 2-2 more practical. If we use impedance scaling with a Z of 1000, we obtain the filters of Figure 2-4. The values are certainly more suitable. Frequency and impedance scaling are normally combined into one step rather than performed sequentially. The denormalized values are then given by Rr R Z LZ FSF C Cr FSF Z Lr
(2-8) (2-9) (2-10)
where the primed values are both frequency- and impedance-scaled. Low-Pass Normalization. In order to use normalized low-pass filter curves and tables, a given low-pass filter requirement must first be converted into a normalized requirement. The curves can now be entered to find a satisfactory normalized filter which is then scaled to the desired cutoff. The first step in selecting a normalized design is to convert the requirement into a steepness factor As, which can be defined as As
fs fc
(2-11)
FIGURE 2-4 The impedance-scaled filters of Example 2-1: (a) LC filter; and (b) active filter.
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13
where fs is the frequency having the minimum required stopband attenuation and fc is the limiting frequency or cutoff of the passband, usually the 3-dB point. The normalized curves are compared with As, and a design is selected that meets or exceeds the requirement. The design is often frequency scaled so that the selected passband limit of the normalized design occurs at fc. If the required passband limit fc is defined as the 3-dB cutoff, the steepness factor As can be directly looked up in radians per second on the frequency axis of the normalized curves. Suppose that we required a low-pass filter that has a 3-dB point at 100 Hz and more than 30-dB attenuation at 400 Hz. A normalized low-pass filter that has its 3-dB point at 1 rad/s and over 30-dB attenuation at 4 rad/s would meet the requirement if the filter were frequency-scaled so that the 3-dB point occurred at 100 Hz. Then there would be over 30-dB attenuation at 400 Hz, or four times the cutoff, because a response shape is retained when a filter is frequency scaled. The following example demonstrates normalizing a simple low-pass requirement. Example 2-2
Normalizing a Low-Pass Specification for a 3-dB cutoff
Required:
Normalize the following specification: A low-pass filter 3 dB at 200 Hz 30-dB minimum at 800 Hz Result:
(a) Compute As. As
fs 800 Hz 4 200 Hz fc
(2-11)
(b) Normalized requirement: 3 dB at 1 rad/s 30-dB minimum at 4 rad/s In the event fc does not correspond to the 3-dB cutoff, As can still be computed and a normalized design found that will meet the specifications. This is illustrated in the following example. Example 2-3
Normalizing a Low-Pass Specification for a 1-dB cutoff
Required:
Normalize the following specification: A low-pass filter 1 dB at 200 Hz 30-dB minimum at 800 Hz Result:
(a) Compute As. As
fs 800 Hz 4 200 Hz fc
(2-11)
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(b) Normalized requirement: 1 dB at K rad/s 30-dB minimum at 4 K rad/s (where K is arbitrary) A possible solution to Example 2-3 would be a normalized filter which has a 1-dB point at 0.8 rad/s and over 30 dB attenuation at 3.2 rad/s. The fundamental requirement is that the normalized filter makes the transition between the passband and stopband limits within a frequency ratio As. A normalized n 3 low-pass Butterworth transfer function
High-Pass Normalization. was given in section 1.1 as
T(s)
1 s 3 2s 2 2s 1
(1-2)
and the results of evaluating this transfer function at various frequencies were v
u T( jv) u
20 log u T( jv) u
0 1 2 3 4
1 0.707 0.124 0.0370 0.0156
0 dB 3 dB 18 dB 29 dB 36 dB
Let’s now perform a high-pass transformation by substituting 1/s for s in Equation (1-2). After some algebraic manipulations, the resulting transfer function becomes T(s)
s3 s 3 2s 2 2s 1
(2-12)
If we evaluate this expression at specific frequencies, we can generate the following table:
v
u T( jv) u
20 log u T( jv) u
0.25 0.333 0.500 1 `
0.0156 0.0370 0.124 0.707 1
36 dB 29 dB 18 dB 3 dB 0 dB
The response is clearly that of a high-pass filter. It is also apparent that the low-pass attenuation values now occur at high-pass frequencies that are exactly the reciprocals of the corresponding low-pass frequencies. A high-pass transformation of a normalized low-pass filter transposes the low-pass attenuation values to reciprocal frequencies and retains the 3-dB cutoff at 1 rad/s. This relationship is evident in Figure 2-5, where both filter responses are compared.
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15
FIGURE 2-5 A normalized low-pass high-pass relationship.
The normalized low-pass curves could be interpreted as normalized high-pass curves by reading the attenuation as indicated and taking the reciprocals of the frequencies. However, it is much easier to convert a high-pass specification into a normalized low-pass requirement and use the curves directly. To normalize a high-pass filter specification, calculate As, which in the case of high-pass filters is given by As
fc fs
(2-13)
Since the As, for high-pass filters is defined as the reciprocal of the As for low-pass filters, Equation (2-13) can be directly interpreted as a low-pass requirement. A normalized low-pass filter can then be selected from the curves. A high-pass transformation is performed on the corresponding low-pass filter, and the resulting high-pass filter is scaled to the desired cutoff frequency. The following example shows the normalization of a high-pass filter requirement. Example 2-4 Normalizing a High-Pass Specification Required:
Normalize the following requirement: A high-pass filter 3 dB at 200 Hz 30-dB minimum at 50 Hz Result:
(a) Compute As. As
fc 200 Hz 4 fs 50 Hz
(2-13)
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(b) Normalized equivalent low-pass requirement: 3 dB at 1 rad/s 30-dB minimum at 4 rad/s Bandpass Normalization. Bandpass filters fall into two categories: narrowband and wideband. If the ratio of the upper cutoff frequency to the lower cutoff frequency is over 2 (an octave), the filter is considered a wideband type. Wideband Bandpass Filters. Wideband filter specifications can be separated into individual low-pass and high-pass requirements which are treated independently. The resulting low-pass and high-pass filters are then cascaded to meet the composite response. Example 2-5
Normalizing a Wideband Bandpass Filter
Required:
Normalize the following specification: bandpass filter 3 dB at 500 and 1000 Hz 40-dB minimum at 200 and 2000 Hz Result:
(a) Determine the ratio of upper cutoff to lower cutoff. 1000 Hz 2 500 Hz wideband type (b) Separate requirement into individual specifications. High-pass filter: 3 dB at 500 Hz 40-dB minimum at 200 Hz
Low-pass filter: 3 dB at 1000 Hz 40-dB minimum at 2000 Hz
As 2.5 (2-13)
As 2.0 (2-11)
(c) Normalized high-pass and low-pass filters are now selected, scaled to the required cutoff frequencies, and cascaded to meet the composite requirements. Figure 2-6 shows the resulting circuit and response. Narrowband Bandpass Filters. Narrowband bandpass filters have a ratio of upper cutoff frequency to lower cutoff frequency of approximately 2 or less and cannot be designed as separate low-pass and high-pass filters. The major reason for this is evident from Figure 2-7. As the ratio of upper cutoff to lower cutoff decreases, the loss at the center frequency will increase, and it may become prohibitive for ratios near unity. If we substitute s 1/s for s in a low-pass transfer function, a bandpass filter results. The center frequency occurs at 1 rad/s, and the frequency response of the low-pass filter is directly transformed into the bandwidth of the bandpass filter at points of equivalent attenuation. In other words, the attenuation bandwidth ratios remain unchanged. This is shown in Figure 2-8, which shows the relationship between a low-pass filter and its transformed bandpass equivalent. Each pole and zero of the low-pass filter is transformed into a pair of poles and zeros in the bandpass filter.
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FIGURE 2-6 The results of Example 2-5: (a) cascade of low-pass and high-pass filters; and (b) frequency response.
In order to design a bandpass filter, the following sequence of steps is involved. 1. Convert the given bandpass filter requirement into a normalized low-pass specification. 2. Select a satisfactory low-pass filter from the normalized frequency-response curves. 3. Transform the normalized low-pass parameters into the required bandpass filter.
FIGURE 2-7 Limitations of the wideband approach for narrowband filters: (a) a cascade of low-pass and high-pass filters; (b) a composite response; and (c) algebraic sum of attenuation.
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FIGURE 2-8 A low-pass to bandpass transformation.
The response shape of a bandpass filter is shown in Figure 2-9, along with some basic terminology. The center frequency is defined as f0 2fL fu
(2-14)
where fL is the lower passband limit and fu is the upper passband limit, usually the 3-dB attenuation frequencies. For the more general case f0 2f1 f2
(2-15)
where f1 and f2 are any two frequencies having equal attenuation. These relationships imply geometric symmetry; that is, the entire curve below f0 is the mirror image of the curve above f0 when plotted on a logarithmic frequency axis. An important parameter of bandpass filters is the filter selectivity factor or Q, which is defined as Q
f0 BW
(2-16)
where BW is the passband bandwidth or fu fL.
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FIGURE 2-9 shape.
19
A general bandpass filter response
As the filter Q increases, the response shape near the passband approaches the arithmetically symmetrical condition which is mirror-image symmetry near the center frequency, when plotted using a linear frequency axis. For Qs of 10 or more, the center frequency can be redefined as the arithmetic mean of the passband limits, so we can replace Equation (2-14) with f0
fL fu 2
(2-17)
In order to utilize the normalized low-pass filter frequency-response curves, a given narrowband bandpass filter specification must be transformed into a normalized low-pass requirement. This is accomplished by first manipulating the specification to make it geometrically symmetrical. At equivalent attenuation points, corresponding frequencies above and below f0 must satisfy f1 f2 f 20
(2-18)
which is an alternate form of Equation (2-15) for geometric symmetry. The given specification is modified by calculating the corresponding opposite geometric frequency for each stopband frequency specified. Each pair of stopband frequencies will result in two new frequency pairs. The pair having the lesser separation is retained, since it represents the more severe requirement. A bandpass filter steepness factor can now be defined as As
stopband bandwidth passband bandwidth
(2-19)
This steepness factor is used to select a normalized low-pass filter from the frequencyresponse curves that makes the passband to stopband transition within a frequency ratio of As.
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The following example shows the normalization of a bandpass filter requirement. Example 2-6
Normalizing a Bandpass Filter Requirement
Required:
Normalize the following bandpass filter requirement: A bandpass filter A center frequency of 100 Hz 3 dB at 15 Hz (85 Hz, 115 Hz) 40 dB at 30 Hz (70 Hz, 130 Hz) Result:
(a) First, compute the center frequency f0. f0 2fL fu 285 115 98.9 Hz
(2-14)
(b) Compute two geometrically related stopband frequency pairs for each pair of stopband frequencies given. Let f1 70 Hz. f2
f 20 (98.9)2 139.7 Hz 70 f1
(2-18)
f1
f 20 (98.9)2 75.2 Hz 130 f2
(2-18)
Let f2 130 Hz.
The two pairs are f1 70 Hz, f2 139.7 Hz ( f2 f1 69.7 Hz) and
f1 75.2 Hz, f2 130 Hz ( f2 f1 54.8 Hz)
Retain the second frequency pair, since it has the lesser separation. Figure 2-10 compares the specified filter requirement and the geometrically symmetrical equivalent. (c) Calculate As. As
stopband bandwidth 54.8 Hz 1.83 30 Hz passband bandwidth
(2-19)
(d) A normalized low-pass filter can now be selected from the normalized curves. Since the passband limit is the 3-dB point, the normalized filter is required to have over 40 dB of rejection at 1.83 rad/s or 1.83 times the 1-rad/s cutoff. The results of Example 2-6 indicate that when frequencies are specified in an arithmetically symmetrical manner, the narrower stopband bandwidth can be directly computed by BWstopband f2
f 20 f2
(2-20)
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FIGURE 2-10 The frequency-response requirements of Example 2-6: (a) a given filter requirement; and (b) a geometrically symmetrical requirement.
The narrower stopband bandwidth corresponds to the more stringent value of As, the steepness factor. It is sometimes desirable to compute two geometrically related frequencies that correspond to a given bandwidth. Upon being given the center frequency f0 and the bandwidth BW, the lower and upper frequencies are respectively computed by f1 f2
a
(2-21)
a
(2-22)
BW 2 BW b f 20 Å 2 2 BW 2 BW b f 20 Å 2 2
Use of these formulas is illustrated in the following example. Example 2-7
Determining Bandpass Filter Bandwidths at Equal Attenuation Points
Required:
For a bandpass filter having a center frequency of 10 kHz, determine the frequencies corresponding to bandwidths of 100 Hz, 500 Hz, and 2000 Hz.
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CHAPTER TWO Result:
Compute f1 and f2 for each bandwidth, using f1 f2
a
(2-21)
a
(2-22)
BW 2 BW b f 20 Å 2 2 BW 2 BW b f 20 Å 2 2
BW, Hz
f1, Hz
F2, Hz
100 500 2000
9950 9753 9050
10,050 10,253 11,050
The results of Example 2-7 indicate that for narrow percentage bandwidths (1 percent) f1 and f2 are arithmetically spaced about f0. For the wider cases, the arithmetic center of f1 and f2 would be slightly above the actual geometric center frequency f0. Another and more meaningful way of stating the converse is that for a given pair of frequencies, the geometric mean is below the arithmetic mean. Bandpass filter requirements are not always specified in an arithmetically symmetrical manner as in the previous examples. Multiple stopband attenuation requirements may also exist. The design engineer is still faced with the basic problem of converting the given parameters into geometrically symmetrical characteristics so that a steepness factor (or factors) can be determined. The following example demonstrates the conversion of a specification somewhat more complicated than the previous example. Example 2-8
Normalizing a Non-Symmetrical Bandpass Filter Requirement
Required:
Normalize the following bandpass filter specification: bandpass filter 1-dB passband limits of 12 kHz and 14 kHz 20-dB minimum at 6 kHz 30-dB minimum at 4 kHz 40-dB minimum at 56 kHz Result:
(a) First, compute the center frequency, using fL 12 kHz
fu 14 kHz
f0 12.96 kHz
(2-14)
(b) Compute the corresponding geometric frequency for each stopband frequency given, using Equation (2-18). f1 f2 f 20
(2-18)
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FIGURE 2-11 The given and transformed responses of Example 2-7: (a) a given requirement; and (b) geometrically symmetrical response.
Figure 2-11 illustrates the comparison between the given requirement and the corresponding geometrically symmetrical equivalent response. f1
f2
6 kHz 4 kHz 3 kHz
28 kHz 42 kHz 56 kHz
(c) Calculate the steepness factor for each stopband bandwidth in Figure 2-11b. 20 dB:
As
22 kHz 11 2 kHz
30 dB:
As
38 kHz 19 2 kHz
40 dB:
As
53 kHz 26.5 2 kHz
(2-19)
(d) Select a low-pass filter from the normalized tables. A filter is required that has over 20, 30, and 40 dB of rejection at, respectively, 11, 19, and 26.5 times its 1-dB cutoff. Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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Band-Reject Normalization Wideband Band-Reject Filters. Normalizing a band-reject filter requirement proceeds along the same lines as for a bandpass filter. If the ratio of the upper cutoff frequency to the lower cutoff frequency is an octave or more, a band-reject filter requirement can be classified as wideband and separated into individual low-pass and high-pass specifications. The resulting filters are paralleled at the input and combined at the output. The following example demonstrates normalization of a wideband band-reject filter requirement. Example 2-9
Normalizing a Wideband Band-Reject Filter
Required:
A band-reject filter 3 dB at 200 and 800 Hz 40-dB minimum at 300 and 500 Hz Result:
(a) Determine the ratio of upper cutoff to lower cutoff, using 800 Hz 4 200 Hz wideband type (b) Separate requirements into individual low-pass and high-pass specifications. Low-pass filter: 3 dB at 200 Hz 40-dB minimum at 300 Hz
High-pass filter: 3 dB at 800 Hz 40-dB minimum at 500 Hz
As 1.5
As 1.6
(2-11)
(2-13)
(c) Select appropriate filters from the normalized curves and scale the normalized lowpass and high-pass filters to cutoffs of 200 Hz and 800 Hz, respectively. Figure 2-12 shows the resulting circuit and response.
The basic assumption of the previous example is that when the filter outputs are combined, the resulting response is the superimposed individual response of both filters. This is a valid assumption if each filter has sufficient rejection in the band of the other filter so that there is no interaction when the outputs are combined. Figure 2-13 shows the case where inadequate separation exists. The requirement for a minimum separation between cutoffs of an octave or more is by no means rigid. Sharper filters can have their cutoffs placed closer together with minimal interaction. Narrowband Band-Reject Filters. The normalized transformation described for bandpass filters where s 1/s is substituted into a low-pass transfer function can instead be applied to a high-pass transfer function to obtain a band-reject filter. Figure 2-14 shows the direct equivalence between a high-pass filter’s frequency response and the transformed band-reject filter’s bandwidth.
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FIGURE 2-12 The results of Example 2-9: (a) combined low-pass and high-pass filters; and (b) a frequency response.
FIGURE 2-13 Limitations of the wideband band-reject design approach: (a) combined low-pass and high-pass filters; (b) composite response; and (c) combined response by the summation of outputs.
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FIGURE 2-14
The relationship between band-reject and high-pass filters.
The design method for narrowband band-reject filters can be defined as follows: 1. Convert the band-reject requirement directly into a normalized low-pass specification. 2. Select a low-pass filter (from the normalized curves) that meets the normalized requirements. 3. Transform the normalized low-pass parameters into the required band-reject filter. This may involve designing the intermediate high-pass filter, or the transformation may be direct. The band-reject response has geometric symmetry just as bandpass filters have. Figure 2-15 defines this response shape. The parameters shown have the same relationship to each other as they do for bandpass filters. The attenuation at the center frequency is theoretically infinite since the response of a high-pass filter at DC has been transformed to the center frequency.
FIGURE 2-15
The band-reject response.
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The geometric center frequency can be defined as f0 2fL fu
(2-14)
where fL and fu are usually the 3-dB frequencies, or for the more general case: f0 2f1 f2
(2-15)
The selectivity factor Q is defined as Q
f0 BW
(2-16)
where BW is fu fL. For Qs of 10 or more, the response near the center frequency approaches the arithmetically symmetrical condition, so we can then state f0
fL fu 2
(2-17)
To use the normalized curves for the design of a band-reject filter, the response requirement must be converted to a normalized low-pass filter specification. In order to accomplish this, the band-reject specification should first be made geometrically symmetrical—that is, each pair of frequencies having equal attenuation should satisfy f1 f2 f 20
(2-18)
which is an alternate form of Equation (2-15). When two frequencies are specified at a particular attenuation level, two frequency pairs will result from calculating the corresponding opposite geometric frequency for each frequency specified. Retain the pair having the wider separation since it represents the more severe requirement. In the bandpass case, the pair having the lesser separation represented the more difficult requirement. The band-reject filter steepness factor is defined by As
passband bandwidth stopband bandwidth
(2-23)
A normalized low-pass filter can now be selected that makes the transition from the passband attenuation limit to the minimum required stopband attenuation within a frequency ratio As. The following example demonstrates the normalization procedure for a band-reject filter. Example 2-10 Normalizing a Narrowband Band-Reject Filter Required:
band-reject filter center frequency of 1000 Hz 3 dB at 300 Hz (700 Hz, 1300 Hz) 40 dB at 200 Hz (800 Hz, 1200 Hz) Result:
(a) First, compute the center frequency f0. f0 2fL fu 2700 1300 954 Hz
(2-14)
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(b) Compute two geometrically related stopband frequency pairs for each pair of stopband frequencies given: Let f1 800 Hz f2
f 20 (954)2 1138 Hz 800 f1
(2-18)
f1
f 20 (954)2 758 Hz 1200 f2
(2-18)
Let f2 1200 Hz
The two pairs are f1 800 Hz, f2 1138 Hz ( f2 f1 338 Hz) and f1 758 Hz, f2 1200 Hz ( f2 f1 442 Hz) Retain the second pair since it has the wider separation and represents the more severe requirement. The given response requirement and the geometrically symmetrical equivalent are compared in Figure 2-16 (c) Calculate As. As
passband bandwidth 600 Hz 1.36 442 Hz stopband bandwidth
(2-23)
FIGURE 2-16 The response of Example 2-10: (a) given requirement; and (b) geometrically symmetrical response.
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(d) Select a normalized low-pass filter from the normalized curves that makes the transition from the 3-dB point to the 40-dB point within a frequency ratio of 1.36. Since these curves are all normalized to 3 dB, a filter is required with over 40 dB of rejection at 1.36 rad/s.
2.2 TRANSIENT RESPONSE In our previous discussions of filters, we have restricted our interest to frequency-domain parameters such as frequency response. The input forcing function was a sine wave. In realworld applications of filters, input signals consist of a variety of complex waveforms. The response of filters to these nonsinusoidal inputs is called transient response. A filter’s transient response is best evaluated in the time domain since we are usually dealing with input signals which are functions of time, such as pulses or amplitude steps. The frequency- and time-domain parameters of a filter are directly related through the Fourier or Laplace transforms. The Effect of Nonuniform Time Delay Evaluating a transfer function as a function of frequency results in both a magnitude and phase characteristic. Figure 2-17 shows the amplitude and phase response of a normalized n 3 Butterworth low-pass filter. Butterworth low-pass filters have a phase shift of exactly n times 45 at the 3-dB frequency. The phase shift continuously increases as the transition is made into the stopband and eventually approaches n times 90 at frequencies far removed from the passband. Since the filter described by Figure 2-17 has a complexity of n 3, the phase shift is 135 at the 3-dB cutoff and approaches 270 in the stopband. Frequency scaling will transpose the phase characteristics to a new frequency range as determined by the FSF. It is well known that a square wave can be represented by a Fourier series of odd harmonic components, as indicated in Figure 2-18. Since the amplitude of each harmonic is reduced as the harmonic order increases, only the first few harmonics are of significance. If a square wave is applied to a filter, the fundamental and its significant harmonics must have a proper relative amplitude relationship at the filter’s output in order to retain the square waveshape. In addition, these components must not be displaced in time with respect to each other. Let’s now consider the effect of a low-pass filter’s phase shift on a square wave.
FIGURE 2-17
The amplitude and phase response of an n 3 Butterworth low-pass filter.
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FIGURE 2-18
The frequency analysis of a square wave.
If we assume that a low-pass filter has a linear phase shift between 0 at DC and n times 45 at the cutoff, we can express the phase shift in the passband as f
45nfx fc
(2-24)
where fx is any frequency in the passband, and fc is the 3-dB cutoff frequency. A phase-shifted sine wave appears displaced in time from the input waveform. This displacement is called phase delay and can be computed by determining the time interval represented by the phase shift, using the fact that a full period contains 360. Phase delay can then be computed by Tpd
f 1 360 fx
(2-25)
or, as an alternate form, b Tpd v
(2-26)
where b is the phase shift in radians (1 rad 360/2p or 57.3) and v is the input frequency expressed in radians per second (v 2pfx). Example 2-11 Effect of Nonlinear Phase on a Square Wave Required:
Compute the phase delay of the fundamental and the third, fifth, seventh, and ninth harmonics of a 1 kHz square wave applied to an n 3 Butterworth low-pass filter having a 3-dB cutoff of 10 kHz. Assume a linear phase shift with frequency in the passband. Result:
Using Equations (2-24) and (2-25), the following table can be computed:
Frequency
f
Tpd
1 kHz 3 kHz 5 kHz 7 kHz 9 kHz
13.5 40.5 67.5 94.5 121.5
37.5 s 37.5 s 37.5 s 37.5 s 37.5 s
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The phase delays of the fundamental and each of the significant harmonics in Example 2-11 are identical. The output waveform would then appear nearly equivalent to the input except for a delay of 37.5 s. If the phase shift is not linear with frequency, the ratio f/fx in Equation (2-25) is not constant, so each significant component of the input square wave would undergo a different delay. This displacement in time of the spectral components, with respect to each other, introduces a distortion of the output waveform. Figure 2-19 shows some typical effects of a nonlinear phase shift upon a square FIGURE 2-19 The effect of a nonlinear phase: wave. Most filters have nonlinear phase ver- (a) an ideal square wave; and (b) a distorted square sus frequency characteristics, so some wave- wave. form distortion will usually occur for complex input signals. Not all complex waveforms have harmonically related spectral components. An amplitudemodulated signal, for example, consists of a carrier and two sidebands, each sideband separated from the carrier by a modulating frequency. If a filter’s phase characteristic is linear with frequency and intersects zero phase shift at zero frequency (DC), both the carrier and the two sidebands will have the same delay in passing through the filter—thus, the output will be a delayed replica of the input. If these conditions are not satisfied, the carrier and both sidebands will be delayed by different amounts. The carrier delay will be in accordance with the equation for phase delay: b (2-26) Tpd v (The terms carrier delay and phase delay are used interchangeably.) A new definition is required for the delay of the sidebands. This delay is commonly called group delay and is defined as the derivative of phase versus frequency, which can be expressed as Tgd
db dv
(2-27)
Linear phase shift results in constant group delay since the derivative of a linear function is a constant. Figure 2-20 illustrates a low-pass filter phase shift which is non-linear in the vicinity of a carrier vc and the two sidebands: vc vm and vc vm. The phase delay at vc is the negative slope of a line drawn from the origin to the phase shift corresponding to vc, which is in agreement with Equation (2-26). The group delay at vc is shown as the negative slope of a line which is tangent to the phase response at vc. This can be mathematically expressed as Tgd
db 2 dv vvc
If the two sidebands are restricted to a region surrounding vc and having a constant group delay, the envelope of the modulated signal will be delayed by Tgd. Figure 2-21 compares the input and output waveforms of an amplitude-modulated signal applied to the filter depicted by Figure 2-20. Note that the carrier is delayed by the phase delay, while the envelope is delayed by the group delay. For this reason, group delay is sometimes called envelope delay.
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FIGURE 2-20 pass filter.
The nonlinear phase shift of a low-
If the group delay is not constant over the bandwidth of the modulated signal, waveform distortion will occur. Narrow-bandwidth signals are more likely to encounter constant group delay than signals having a wider spectrum. It is common practice to use a groupdelay variation as a criterion to evaluate phase nonlinearity and subsequent waveform distortion. The absolute magnitude of the nominal delay is usually of little consequence. Step Response of Networks. If we were to define a hypothetical ideal low-pass filter, it would have the response shown in Figure 2-22. The amplitude response is unity from DC
FIGURE 2-21
The effect of nonlinear phase on an AM signal.
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FIGURE 2-22 An ideal low-pass filter: (a) frequency response; (b) phase shift; and (c) group delay.
to the cutoff frequency vc, and zero beyond the cutoff. The phase shift is a linearly increasing function in the passband, where n is the order of the ideal filter. The group delay is constant in the passband and zero in the stopband. If a unity amplitude step were applied to this ideal filter at t 0, the output would be in accordance with Figure 2-23. The delay of the half-amplitude point would be np/2vc, and the rise time, which is defined as the interval required to go from zero amplitude to unity amplitude with a slope equal to that at the halfamplitude point, would be equal to p/vc. Since rise time is inversely proportional to vc, a wider filter results in reduced rise time. This proportionality is in agreement with a fundamental rule of thumb relating rise time to bandwidth, which is Tr
2 . Resistor R1b should be composed of a fixed resistor in series with a single-turn potentiometer to provide good resolution. Adjustment of Q can be accomplished by making R2 adjustable. However, this will affect resonant frequency and in any event is not necessary for most filters if 1- or 2-percent tolerance parts are used. The section gain can be varied by making R1a adjustable, but again resonant frequency may be affected. In conclusion, this circuit is highly recommended for low Q requirements. Although a large spread in resistance values can occur and the Q is limited by amplifier gain, the circuit simplicity, low element sensitivity, and ease of frequency adjustment make it highly desirable. The following example demonstrates the design of a bandpass filter using the MFBP configuration. Example 5-12 Design of an Active All-Pole Bandpass Filter Using the MFBP Configuration Required:
Design an active bandpass filter having the following specifications: A center frequency of 300 Hz 3 dB at 10 Hz 25-dB minimum at 40 Hz Essentially zero overshoot to a 300-Hz carrier pulse step A gain of 12 dB at 300 Hz Result:
(a) Since the bandwidth is narrow, the requirement can be treated on an arithmetically symmetrical basis. The bandpass steepness factor is given by As
stopband bandwidth 80 Hz 4 20 Hz passband bandwidth
(2-19)
The curves of Figures 2-69 and 2-74 indicate that an n 3 transitional gaussian to 6-dB filter will meet the frequency- and step-response requirements. (b) The pole locations for the corresponding normalized low-pass filter are found in Table 11-50 and are as follows: 0.9622 j1.2214 0.9776 First compute the bandpass Q: Q bp
f0 300 Hz 15 BW3 dB 20 Hz
(2-16)
The low-pass poles are transformed to the bandpass form in the following manner: Complex pole:
a 0.9622 b 1.2214 C 2.417647
(5-50)
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D 0.128293
(5-51)
E 4.010745
(5-52)
G 4.002529
(5-53)
Q 15.602243
(5-54)
M 1.000832
(5-55)
W 1.041630
(5-56)
fra 288.0 Hz
(5-57)
frb 312.5 Hz
(5-58)
Real pole:
a0 0.9776 Q 15.34
(5-59)
fr 300.0 Hz (c) A midband gain of 12 dB is required. Let us allocate a gain of 4 dB to each section corresponding to A0 1.585. The value of Ar, the resonant frequency gain for each section, is obtained from Equation (5-64) and is listed in the following table, which summarizes the design parameters of the filters sections:
Section 1 Section 2 Section 3
fr
Q
Ar
288.0 Hz 312.5 Hz 300.0 Hz
15.60 15.60 15.34
2.567 2.567 1.585
(d) Three MFBP bandpass sections will be connected in tandem. The following element values are computed where C is set equal to 0.1 F: Section 1:
R2 R1a R1b
Q 15.6 172.4 k pfrC p 288 107
(5-68)
R2 172.4 103 33.6 k 2Ar 2 2.567
(5-72)
R2/2 2Q 2 Ar
86.2 103 178 2 15.62 2.567
Section 2:
Section 3:
R2 158.9 k R1a 30.9 k R1b 164
R2 162.8 k R1a 51.3 k R1b 174
(5-73)
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FIGURE 5-26
211
The MFBP circuit of Example 5-12.
The final circuit is shown in Figure 5-26. Resistor values have been rounded off to standard 1-percent values, and resistor R1b has been made variable in each section for tuning purposes. Each filter section can be adjusted by applying a sine wave at the section fr to the filter input. The phase shift of the section being adjusted is monitored by connecting one channel of an oscilloscope to the section input and the other channel to the section output. A Lissajous pattern is thus obtained. Resistor R1b is then adjusted until the ellipse closes to a straight line. The Dual-Amplifier Bandpass (DABP) Structure. The bandpass circuit of Figure 5-27 was first introduced by Sedra and Espinoza (see Bibliography). Truly remarkable performance in terms of available Q, low sensitivity, and flexibility can be obtained in comparison with alternate schemes involving two amplifiers. The transfer function is given by T(s)
s2/R1C s 2 s1/R1C 1/R2R3C 2
(5-78)
FIGURE 5-27 A dual-amplifier bandpass (DABP) configuration (Q 15).
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If we compare this expression with the general bandpass transfer function of Equation (548) and let R2R3 R2, the following design equations for the element values can be obtained. First, compute R
1 2pfrC
R1 QR R2 R3 R
then
(5-79) (5-80) (5-81)
where C is arbitrary. The value of Rr in Figure 5-27 can also be chosen at any convenient value. Circuit gain at fr is equal to 2. The following sensitivities can be derived: S QR1 1
(5-82)
S fRr 2 S fRr 3 S fRr 4 S fCr 1/2
(5-83)
S fRr 5
1/2
(5-84)
An interesting result of sensitivity studies is that if the bandwidths of both amplifiers are nearly equivalent, extremely small deviations of Q from the design values will occur. This is especially advantageous at higher frequencies where the amplifier poles have to be taken into account. It is then suggested that a dual-type amplifier be used for each filter section since both amplifier halves will be closely matched to each other. A useful feature of this circuit is that resonant frequency and Q can be independently adjusted. Alignment can be accomplished by first adjusting R2 for resonance at fr. Resistor R1 can then be adjusted for the desired Q without affecting the resonant frequency. Since each section provides a fixed gain of 2 at fr, a composite filter may require an additional amplification stage if higher gains are needed. If a gain reduction is desired, resistor R1 can be split into two resistors to form a voltage divider in the same manner as in Figure 5-25b. The resulting values are 2R1 (5-85) Ar R1a Ar R1b and (5-86) 2 Ar where Ar is the desired gain at resonance. The spread of element values of the MFBP section previously discussed is equal to 4Q2. In comparison, this circuit has a ratio of resistances determined by Q, so the spread is much less. The DABP configuration has been found very useful for designs covering a wide range of Qs and frequencies. Component sensitivity is small, resonant frequency and Q are easily adjustable, and the element spread is low. The following example illustrates the use of this circuit. R1a
Example 5-13 Design of an Active All-Pole Bandpass Filter Using the DABP Configuration Required:
Design an active bandpass filter to meet the following specifications: A center frequency of 3000 Hz 3 dB at 30 Hz 20-dB minimum at 120 Hz
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Result:
(a) If we consider the requirement as being arithmetically symmetrical, the bandpass steepness factor becomes As
stopband bandwidth 240 Hz 4 passband bandwidth 60 Hz
(2-19)
We can determine from the curve of Figure 2-34 that a second-order Butterworth low-pass filter provides over 20 dB of rejection within a frequency ratio of 4:1. The corresponding poles of the normalized low-pass filter are found in Table 11-1 and are as follows: 0.7071 j0.7071 (b) To convert these poles to the bandpass form, first compute: Q bp
f0 3000 Hz 50 BW3 dB 60 Hz
(2-16)
The bandpass poles transformation is performed in the following manner: a 0.7071 b 0.7071 C 1.000000
(5-50)
D 0.028284
(5-51)
E 4.000400
(5-52)
G 4.000000
(5-53)
Q 70.713124
(5-54)
M 1.000025
(5-55)
W 1.007096
(5-56)
fra 2978.9 Hz
(5-57)
frb 3021.3 Hz
(5-58)
(c) Two DABP sections will be used. The element values are now computed, where C is set equal to 0.01F and Rr is 10 k. Section 1:
fr 2978.9 Hz Q 70.7 R
1 1 5343 2pfrC 2p 2978.9 108
(5-79)
R1 QR 70.7 5343 377.7 k
(5-80)
R2 R3 R 5343
(5-81)
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FIGURE 5-28
The DABP filter of Example 5-13.
Section 2:
fr 3021.3 Hz Q 70.7 R 5268
(5-79)
R1 372.4 k
(5-80)
R2 R3 5268
(5-81)
The circuit is illustrated in Figure 5-28, where resistors have been rounded off to standard 1-percent values and R2 is made adjustable for tuning. Low-Sensitivity Three-Amplifier Configuration. The DABP circuit shown in Figure 5-27 provides excellent performance and is useful for general-purpose bandpass filtering. A modified version utilizing a total of three amplifiers is shown in Figure 5-29. This circuit will exhibit performance superior to the DABP configuration, especially at higher frequencies. Using this structure and off-the-shelf op amps, active bandpass filters having moderate percentage bandwidths can be designed to operate in the frequency range approaching 1–2 MHz. The section within the dashed line in Figure 5-29 realizes a shunt inductance to ground using a configuration called a gyrator.* Both op amps within this block should be closely matched to obtain low op-amp sensitivity at high frequencies, so the use of a dual op amp for this location would be highly recommended. The third op amp serves as a voltage follower or buffer to obtain low output impedance.
*A gyrator is an impedance inverting device which converts an impedance Z into a reciprocal impedance 1/G2Z, where G is a constant. Therefore, a capacitor having an impedance 1/SC can be converted into an impedance SC/G2, which corresponds to an inductance of C/G2. For this circuit 1/R, so L R2C.
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FIGURE 5-29 Low-sensitivity three-amplifier bandpass configuration.
As in the case of the DABP circuit, resonant frequency and Q can be adjusted independently. The design proceeds as follows: First select a convenient value for C. Then compute R
1 2pfrC
(5-87)
Let R2 R3 R4 R5 R R1 QR
Then
(5-88)
Circuit gain at fr is unity. For additional gain, the voltage follower can be configured as a noninverting amplifier. For alignment, first adjust R2 for resonance at fr. Resistor R1 can then be adjusted for the desired Q without affecting the resonant frequency. Example 5-14 Design of an Active All-Pole Bandpass Filter Using the LowSensitivity Three-Amplifier Configuration Required:
Design an active bandpass filter to meet the following specifications: A center frequency of 30 kHz 3 dB at 300 Hz 20-dB minimum at 1200 Hz Result:
(a) Treating the requirement as being arithmetically symmetrical, the bandpass steepness factor is As
stopband bandwidth 2400 Hz 4 passband bandwidth 600 Hz
(2-19)
From Figure 2-34, a second-order Butterworth low-pass filter meets the attenuation. The low-pass poles from Table 11-1 are 0.7071 j0.7071.
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(b) These poles must now be converted to the bandpass form. The procedure is as follows Q bp
f0 30,000 Hz 50 BW3 dB 600 Hz
(2-16)
a 0.7071 b 0.7071 C1
(5-50)
D 0.028284
(5-51)
E 4.000400
(5-52)
G 4.000000
(5-53)
Q 70.713124
(5-54)
M 1.000025
(5-55)
W 1.007096
(5-56)
fra 29.789 kHz
(5-57)
frb 30.213 kHz
(5-58)
(c) Compute the element values for the circuit of Figure 5-29 using C 0.01 F. Section 1:
fr 29.789 kHz Q 70.71 R
1 1 2pfrC 2p 29.789 105
534.3 R1 QR 70.7 534.3 37.8 k
(5-87) (5-88)
Section 2:
fr 30.213 kHz Q 70.71 R 526.8
(5-87)
R1 37.2 k
(5-88)
The circuit of this example is illustrated in Figure 5-30 using standard 1-percent resistor values and a potentiometer for frequency adjustment. The State-Variable (Biquad) All-Pole Circuit. The state-variable or biquad configuration was first introduced in Section 3.2 for use as a low-pass filter section. A bandpass output is available as well. The biquad approach features excellent sensitivity properties and
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FIGURE 5-30
217
The bandpass filter of Example 5-14.
the capability to control resonant frequency and Q independently. It is especially suited for constructing precision-active filters in a standard form. The circuit of Figure 5-31 is the all-pole bandpass form of the general biquadratic configuration. The transfer function is given by T(s)
s/CR4 s 2 s/CR1 1/R2R3C 2
(5-89)
If we equate this expression to the general bandpass transfer function of Equation (5-48), the circuit resonant frequency and 3-dB bandwidth can be expressed as fr BW3 dB
and
1 2p C 2R2R3 1 2pR1C
(5-90) (5-91)
where BW3 dB is equal to fr /Q.
FIGURE 5-31
A biquad all-pole circuit (Q 200).
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Equations (5-90) and (5-91) indicate that the resonant frequency and 3-dB bandwidth can be independently controlled. This feature is highly desirable and can lead to many useful applications, such as variable filters. If we substitute fr /Q for BW3 dB and set R2 R3, the following design equations can be derived for the section: R1
Q 2pfrC
R2 R3
(5-92) R1 Q
(5-93)
R1 (5-94) Ar where Ar is the desired gain at resonant frequency fr. The values of C and Rr in Figure 5-31 can be conveniently selected. By making R3 and R1 adjustable, the resonant frequency and Q, respectively, can be adjusted. The sensitivity factors are R4
and
and
S Rfr2 S Rfr3 S Cfr 1/2
(5-95)
S QR1 1
(5-96)
2Q S Qm m
(5-97)
where is the open-loop gain of amplifiers A1 and A2. The section Q is then limited by the finite gain of the operational amplifier. Another serious limitation occurs because of finite amplifier bandwidth. Thomas (see Bibliography) has shown that, as the resonant frequency increases for a fixed design Q, the actual Q remains constant over a broad band and then begins to increase, eventually becoming infinite (oscillatory). This effect is called Q enhancement. If we assume that the open-loop transfer function of the amplifier has a single pole, the effective Q can be approximated by Q eff
Q design 2 Q design 1 m v (2vr vc) 0 c
(5-98)
where vr is the resonant frequency, vc is the 3-dB breakpoint of the open-loop amplifier gain, and m0 is the open-loop gain at DC. As vr is increased, the denominator approaches zero. The Q-enhancement effect can be minimized by having a high gain-bandwidth product. If the amplifier requires external frequency compensation, the compensation can be made lighter than the recommended values. The state-variable circuit is well suited for light compensation since the structure contains two integrators which have a stabilizing effect. A solution suggested by Thomas is to introduce a leading phase component in the feedback loop which compensates for the lagging phase caused by finite amplifier bandwidth. This can be achieved by introducing a capacitor in parallel with resistor R3 having the value Cp
4 m0vcR3
(5-99)
Probably the most practical solution is to make resistor R1 variable. The Q may be determined by measuring the 3-dB bandwidth. R1 is adjusted until the ratio fr / BW3 dB is equal to the required Q.
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As the Q is enhanced, the section gain is also increased. Empirically it has been found that correcting for the gain enhancement compensates for the Q enhancement as well. R1 can be adjusted until the measured gain at fr is equal to the design value of Ar used in Equation (5-94). Although this technique is not as accurate as determining the actual Q from the 3-dB bandwidth, it certainly is much more convenient and will usually be sufficient. The biquad is a low-sensitivity filter configuration suitable for precision applications. Circuit Qs of up to 200 are realizable over a broad frequency range. The following example demonstrates the use of this structure. Example 5-15 Design of an Active All-Pole Bandpass Filter Using the Biquad Configuration Required:
Design an active bandpass filter satisfying the following specifications: A center frequency of 2500 Hz 3 dB at 15 Hz 15-dB minimum at 45 Hz A gain of 12 dB at 2500 Hz Result:
(a) The bandpass steepness factor is determined from As
stopband bandwidth 90 Hz 3 30 Hz passband bandwidth
(2-19)
Using Figure 2-42, we find that a second-order 0.1-dB Chebyshev normalized lowpass filter will meet the attenuation requirements. The corresponding poles found in Table 11-23 are as follows: 0.6125 j0.7124 (b) To transform these low-pass poles to the bandpass form, first compute Q bp
f0 2500 Hz 83.33 BW3 dB 30 Hz
(2-16)
The bandpass poles are determined from the following series of computations. Since the filter is very narrow, an extended number of significant figures will be used in Equations (5-50) through (5-58) to maintain accuracy. a 0.6125 b 0.7124 C 0.882670010
(5-50)
D 0.014700588
(5-51)
E 4.000127115
(5-52)
G 4.000019064
(5-53)
Q 136.0502228
(5-54)
M 1.000009138
(5-55)
W 1.004284182
(5-56)
fra 2489.3 Hz
(5-57)
frb 2510.7 Hz
(5-58)
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(c) Since a midband gain of 12 dB is required, each section will be allocated a midband gain of 6 dB corresponding to A0 2.000. The gain Ar at the resonant frequency of each section is determined from Equation (5-65) and is listed in the following table:
Section 1 Section 2
fr
Q
Ar
2489.3 Hz 2510.7 Hz
136 136
3.069 3.069
(d) Two biquad sections in tandem will be used. C is chosen to be 0.1 F and Rr is 10 k. The element values are computed as follows: Section 1:
R1
Q 136 86.9 k 2pfrC 2p 2489.3 107
R2 R3 R4
R1 86.9 103 639 Q 136
(5-92) (5-93)
R1 86.9 103 28.3 k Ar 3.069
(5-94)
R1 86.2 k
(5-92)
R2 R3 634
(5-93)
R4 28.1 k
(5-94)
Section 2:
The final circuit is shown in Figure 5-32. Resistors R3 and R1 are made variable so that resonant frequency and Q can be adjusted. Standard values of 1-percent resistors have been used. The Q-Multiplier Approach. Certain active bandpass structures such as the MFBP configuration of Section 5.2 are severely Q-limited because of insufficient amplifier gain or other inadequacies. The technique outlined in this section uses a low-Q-type bandpass circuit within a Q-multiplier structure which increases the circuit Q to the desired value. A bandpass transfer function having unity gain at resonance can be expressed as vr s Q (5-100) T(s) vr s 2 s v2r Q If the corresponding circuit is combined with a summing amplifier in the manner shown in Figure 5-33a, where is an attenuation factor, the following overall transfer function can be derived: vr s Q T(s) (5-101) vr s v2r s2 Q Q 1b Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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FIGURE 5-32
221
The biquad circuit of Example 5-15.
The middle term of the denominator has been modified so that the circuit Q is given by Q/(1 ), where 0 1. By selecting a sufficiently close to unity, the Q can be increased by the factor 1/(1 ). The circuit gain is also increased by the same factor. If we use the MFBP section for the bandpass circuit, the Q-multiplier configuration will take the form of Figure 5-33b. Since the MFBP circuit is inverting, an inverting amplifier can also be used for summing. The value of can be found from b1
Qr Q eff
(5-102)
where Qeff is the effective overall Q, and Qr is the design Q of the bandpass section. The component values are determined by the following equations: R b
(5-103)
R4 R
(5-104)
R3
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FIGURE 5-33 Q-multiplier circuit: (a) block diagram; and (b) a realization using an MFBP section.
R5
and
R (1 b)Ar
(5-105)
where R can be conveniently chosen and Ar is the desired gain at resonance. Design equations for the MFBP section were derived in Section 5.2 and are repeated here corresponding to unity gain. Qr (5-68) R2 pfrC R2 (5-72) R1a 2 R1a R1b and (5-73) 2Q 2r 1 The value of C can be freely chosen. The configuration of Figure 5-33b is not restricted to the MFBP section. The statevariable all-pole bandpass circuit may be used instead. The only requirements are that the filter section be of an inverting type and that the gain be unity at resonance. This last requirement is especially critical because of the positive feedback nature of the circuit. Small gain errors could result in large overall Q variations when is close to 1. It may then be desirable to adjust section gain precisely to unity. Example 5-16 Design of an Active Bandpass Filter Section Using the Q-Multiplier Configuration Required:
Design a single bandpass filter section having the following characteristics: A center frequency of 3600 Hz 3-dB bandwidth of 60 Hz A gain of 3 Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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Result:
(a) The bandpass Q is given by Qr
f0 3600 Hz 60 BW3 dB 60 Hz
(2-16)
A Q-multiplier implementation using the MFBP section will be employed. (b) Let us use a Qr of 10 for the MFBP circuit. The following component values are computed where C is set equal to 0.01 F. R2 R1a R1b
Qr 10 88.4 k pfrC p3600 108
(5-68)
R2 88.4 103 44.2 k 2 2
(5-72)
R1a 2Q 2r
1
44.2 103 222 2 102 1
(5-73)
The remaining values are given by the following design equations where R is chosen at 10 k and gain Ar is equal to 3: b1 R3
Qr 10 1 0.8333 Q eff 60
104 R 12.0 k b 0.8333
R4 R 10 k R5
104 R 20 k (1 b)Ar (1 0.8333)3
(5-102) (5-103) (5-104) (5-105)
The resulting circuit is shown in Figure 5-34 using standard resistor values. R1b has been made adjustable for tuning.
FIGURE 5-34
The Q-multiplier section of Example 5-16.
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Elliptic-Function Bandpass Filters. An active elliptic-function bandpass filter is designed by first transforming the low-pass poles and zeros to the bandpass form using the formulas of Section 5.2. The bandpass poles and zeros are then implemented using active structures. Normalized low-pass poles and zeros for elliptic-function low-pass filters can be obtained in terms Q, v0, v`, and a0 using the Filter Solutions program. The general form of a bandpass transfer function containing zeros was given in Section 5.2 as T(s)
H(s 2 v2`) vr s 2 s v2r Q
(5-49)
Elliptic-function bandpass filters are composed of cascaded first-order bandpass sections. When n is odd, n 1 zero-producing sections are required, along with a single allpole section. When n is even, n 2 zero-producing sections are used, along with two all-pole networks. This section discusses the VCVS and biquad configurations, which have a transfer function in the form of Equation (5-49) and their use in the design of active elliptic-function bandpass filters. VCVS Network. Section 3.2 discussed the design of active elliptic-function low-pass filters using an RC section containing a voltage-controlled voltage source (VCVS). The circuit is repeated in Figure 5-35a. This structure is not restricted to the design of low-pass filters extensively. Transmission zeros can be obtained at frequencies either above or below the pole locations as required by the bandpass transfer function. First, calculate 1 Q
(5-106)
f` 2 b a b fr
(5-107)
c 2pfr
(5-108)
a
where Q, f`, and fr are the bandpass parameters corresponding to the general form bandpass transfer function given in Equation 5-49. The element values are computed as follows: Select C. Then
C1 C
(5-109)
C3 C4 and
C2 R3
C1 2
C1(b 1) 4 1 cC1 2b
R1 R2 2R3 R4
4 2b cC1(1 b) 4cC2
(5-110) (5-111) (5-112) (5-113) (5-114)
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FIGURE 5-35 The VCVS elliptic-function bandpass section: (a) circuit for K 1; and (b) circuit for K 1.
K2
2C2 a 2 1 a aC2 b cR C1 4 2 2b C1 2b
(5-115)
R6 R
(5-116)
R7 (K 1)R
(5-117)
where R can be arbitrarily chosen. In the event that K is less than 1, the circuit of Figure 5-35b is used. Resistor R4 is split into two resistors, R4a and R4b, which are given by
and
R4a (1 K) R4
(5-118)
R4b KR4
(5-119)
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The section Q can be controlled independently of resonant frequency by making R6 or R7 adjustable when K 1. The resonant frequency, however, is not easily adjusted. Experience has shown that with 1-percent resistors and capacitors, section Qs of up to 10 can be realized with little degradation to the overall filter response due to component tolerances. The actual circuit Q cannot be measured directly since the section’s 3-dB bandwidth is determined not only by the design Q but by the transmission zero as well. Nevertheless, the VCVS configuration uses a minimum number of amplifiers and is widely used by low-Q elliptic-function realizations. The design technique is demonstrated in the following example. Example 5-17 Design of an Active Elliptic-Function Bandpass Filter Using the VCVS Configuration Required:
An active bandpass filter A center frequency of 500 Hz 1-dB maximum at 100 Hz (400 Hz, 600 Hz) 35-dB minimum at 363 Hz (137 Hz, 863 Hz) Result:
(a) Convert to geometrically symmetrical bandpass requirements: First, calculate the geometric center frequency f0 2fL fu 2400 600 490.0 Hz
(2-14)
Since the stopband requirement is arithmetically symmetrical, compute stopband bandwidth using Equation (5-18). BW35 dB f2
f 20 4902 863 584.8 Hz f2 863
The bandpass steepness factor is given by As
stopband bandwidth 584.8 Hz 2.924 200 Hz passband bandwidth
(2-19)
(b) Open Filter Solutions. Check the Stop Band Freq box. Enter .18 in the Pass Band Ripple(dB) box. Enter 1 in the Pass Band Freq box. Enter 2.924 in the Stop Band Freq box. Check the Frequency Scale Rad/Sec box. (c) Click the Set Order control button to open the second panel. Enter 35 for the Stopband Attenuation (dB). Click the Set Minimum Order button and then click Close. 3 Order is displayed on the main control panel. (d) Click the Transfer Function button. Check the Casc box.
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The following is displayed:
(e) The normalized low-pass design parameters are summarized as follows: Section Q 1.56 Section v0 1.2 Section v` 3.351 a0 0.883 (from the denominator) The pole coordinates in rectangular form are a
v0 0.3646 2Q
b 2v20 a 2 1.1367 ( f ) To determine the bandpass parameters, first compute Q bp
f0 490 Hz 2.45 BW1 dB 200 Hz
(2-16)
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The poles and zeros are transformed as follows: Complex pole:
a 0.3846 b 1.1367 C 1.440004
(5-50)
D 0.313959
(5-51)
E 4.239901
(5-52)
G 4.193146
(5-53)
Q 6.540396
(5-54)
M 1.026709
(5-55)
W 1.259369
(5-56)
fra 389 Hz
(5-57)
frb 617 Hz
(5-58)
Real pole:
a0 0.883 Q 2.7746
(5-59)
fr 490 Hz Zero:
v` 3.351 H 1.935377
(5-60)
Z 1.895359
(5-61)
f`,a 258.5 Hz
(5-62)
f`,b 928.7 Hz
(5-63)
The bandpass parameters are summarized in the following table, where the zeros are arbitrarily assigned to the first two sections:
Section
fr
Q
f
1 2 3
389 Hz 617 Hz 490 Hz
6.54 6.54 2.77
258.5 Hz 928.7 Hz
(g) Sections 1 and 2 are realized using the VCVS configuration of Figure 5-35. The element values are computed as follows, where Rr and R are both 10 k.
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Section 1:
fr 389 Hz Q 6.54 f 259 Hz a 0.15291
(5-106)
b 0.4433
(5-107)
c 2444
(5-108)
Let
C 0.02 F
then
C1 0.02 F
(5-109)
C3 C4 0.01 F
(5-110)
C2 0.0027835 F
(5-111)
Let
C2 0 R3 30.725 k
(5-112)
R1 R2 61.450 k
(5-113)
R4 97.866 k
(5-114)
K 2.5131
(5-115)
Section 2:
fr 617 Hz Q 6.54 f 929 Hz a 0.15291
(5-106)
b 2.2671
(5-107)
c 3877
(5-108)
Let
C 0.02 F
then
C1 0.02 F
(5-109)
C3 C4 0.01 F
(5-110)
C2 0.006335 F
(5-111)
Let
C2 0.01 F R3 8566
(5-112)
R1 R2 17.132 k
(5-113)
R4 105.98 k
(5-114)
K 3.0093
(5-115)
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FIGURE 5-36
The circuit of the elliptic-function bandpass filter in Example 5-17.
(h) Section 3 is required to be of the all-pole type, so the MFBP configuration of Figure 5-25b will be used, where C is chosen as 0.01 F and the section gain Ar is set to unity: Section 3:
fr 490 Hz Q 2.77 R2 179.9 k
(5-68)
R1a 89.97 k
(5-72)
R1b 6.27 k
(5-73)
The complete circuit is shown in Figure 5-36 using standard 1-percent resistor values. State-Variable (Biquad) Circuit. The all-pole bandpass form of the state-variable or biquad section was discussed in Section 5.2. With the addition of an operational amplifier, the circuit can be used to realize transmission zeros as well as poles. The configuration is shown in Figure 5-37. This circuit is identical to the elliptic-function low-pass and highpass filter configurations of Sections 3.2 and 4.2. By connecting R5 either to node 1 or to node 2, the zero can be located above or below the resonant frequency. On the basis of sensitivity and flexibility, the biquad configuration has been found to be the optimum method of constructing precision active elliptic-function bandpass filters. Section Qs of up to 200 can be obtained, whereas the VCVS section is limited to Qs below 10. Resonant frequency fr, Q, and notch frequency f can be independently monitored and adjusted.
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FIGURE 5-37
231
A biquad elliptic-function bandpass configuration.
For the case where f fr, the transfer function is given by
R6 T(s) R
R3R 1 a1 b R4R5 R2R3C 2 1 1 s2 s R1C R2R3C 2
s2
(5-120)
and when f fr, the corresponding transfer function is
R6 T(s) R
R3R 1 a1 b R4R5 R2R3C 2 1 1 s2 s R1C R2R3C 2
s2
(5-121)
If we equate the transfer-function coefficients to those of the general bandpass transfer function (with zeros) of Equation (5-49), the following series of design equations can be derived: R1 R4
Q 2pfrC
(5-122)
R2 R3
R1 Q
(5-123)
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R5
f 2r R Q Z f f 2` Z 2 r
f 2r R
for f` fr:
R6
and when f` fr:
R6 R
f 2`
(5-124) (5-125) (5-126)
where C and R can be conveniently selected. The value of R6 is based on unity section gain. The gain can be raised or lowered by proportionally changing R6. The section can be tuned by implementing the following steps in the indicated sequence. Both resonant frequency and Q are monitored at the bandpass output occurring at node 3, whereas the notch frequency f is observed at the section output. 1. Resonance frequency fr: If R3 is made variable, the section resonant frequency can be adjusted. Resonance is monitored at node 3 (see Figure 5-37) and can be determined by the 180 phase shift method. 2. Q adjustment: The section Q is controlled by R1 and can be directly measured at node 3. The configuration is subject to the Q-enhancement effect discussed in Section 5.2 under “All-Pole Bandpass Configurations,” so a Q adjustment is normally required. The Q can be monitored in terms of the 3-dB bandwidth at node 3, or R1 can be adjusted until unity gain occurs between the section input and node 3 with fr applied. 3. Notch frequency f`: Adjustment of the notch frequency (transmission zero) usually is not required if the circuit is previously tuned to fr, since f` will usually then fall in. If an adjustment is desired, the notch frequency can be controlled by making R5 variable. The biquad approach is a highly stable and flexible implementation for precision active elliptic-function filters. The independent adjustment capability for resonant frequency, Q, and the notch frequency preclude its use when Qs in excess of 10 are required. Stable Qs of up to 200 are obtainable. Example 5-18 Design of an Active Elliptic-Function Bandpass Filter Using the Biquad Configuration Required:
An active bandpass filter A center frequency 500 Hz 0.2-dB maximum at 50 Hz (450 Hz, 550 Hz) 30-dB minimum at 130 Hz (370 Hz, 630 Hz) Result:
(a) Convert to the geometrically symmetrical requirement f0 2fL fu 2450 550 497.5 Hz
(2-14)
f 497.52 630 237.1 Hz f2 630
(5-18)
stopband bandwidth 237.1 Hz 2.371 100 Hz passband bandwidth
(2-19)
BW30 dB f2 As
2 0
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(b) Open Filter Solutions. Check the Stop Band Freq box. Enter .18 in the Pass Band Ripple(dB) box. Enter 1 in the Pass Band Freq box. Enter 2.371 in the Stop Band Freq box. Check the Frequency Scale Rad/Sec box. (c) Click the Set Order control button to open the second panel. Enter 30 for the Stopband Attenuation (dB). Click the Set Minimum Order button and then click Close. 3 Order is displayed on the main control panel. (d) Click the Transfer Function button. Check the Casc box. The following is displayed:
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(e) The normalized low-pass design parameters are summarized as follows: Section Q 1.636 Section v0 1.198 Section v` 2.705 a0 0.9105 (from the denominator) The pole coordinates in rectangular form are a
v0 0.3661 2Q
b 2v20 a 2 1.1408 ( f ) The bandpass pole-zero transformation is now performed. First compute Q bp
f0 497.5 Hz 4.975 BW0.2 dB 100 Hz
(2-16)
The transformation proceeds as follows: Complex pole:
a 0.3661 b 1.1408 C 1.435454
(5-50)
D 0.147176
(5-51)
E 4.05800
(5-52)
G 4.047307
(5-53)
Q 13.678328
(5-54)
M 1.006560
(5-55)
W 1.121290
(5-56)
fra 443.6 Hz
(5-57)
frb 557.8 Hz
(5-58)
Real pole:
a0 0.9105 Q 5.464
(5-59)
fr 497.5 Hz Zero:
v` 2.705 H 1.147815
(5-60)
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235
Z 1.308154
(5-61)
f`,a 380.31 Hz
(5-62)
f`,b 650.81 Hz
(5-63)
The computed bandpass parameters are summarized in the following table. The zeros are assigned to the first two sections. Section
fr
Q
f
1 2 3
443.6 Hz 557.8 Hz 497.5 Hz
13.7 13.7 5.46
380.3 Hz 650.8 Hz
(g) Sections 1 and 2 will be realized in the form of the biquad configuration of Figure 5-37 where Rr and R are both 10 k and C 0.047 F. Section 1:
fr 443.6 Hz Q 13.7 f` 380.3 Hz R1 R4
Q 104.58 k 2pfrC
(5-122)
R2 R3
R1 7.63 k Q
(5-123)
R5
f 2r R Q Z f 2r f 2` Z
2.76 k
R6 R 10 k
(5-124) (5-126)
Section 2:
fr 557.8 Hz Q 13.7 f` 650.8 Hz R1 R4 83.17 k
(5-122)
R2 R3 6.07 k
(5-123)
R5 2.02 k
(5-124)
R6 7.35 k
(5-125)
(h) The MFBP configuration of Figure 5-25b will be used for the all-pole circuit of section 3. The value of C is 0.047 F, and Ar is unity.
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CHAPTER FIVE Section 3:
fr 497.5 Hz Q 5.46 R2 74.3 k
(5-68)
R1a 37.1 k
(5-72)
R1b 634
(5-73)
The resulting filter is shown in Figure 5-38, where standard 1-percent resistors are used. The resonant frequency and Q of each section have been made adjustable.
FIGURE 5-38
The biquad elliptic-function bandpass filter of Example 5-18.
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BIBLIOGRAPHY Huelsman, L. P. Theory and Design of Active RC Circuits. New York: McGraw-Hill, 1968. Sedra, A. S., and J. L. Espinoza. “Sensitivity and Frequency Limitations of Biquadratic Active Filters.” IEEE Transactions on Circuits and Systems CAS-22, no. 2 (February, 1975). Thomas, L. C. “The Biquad: Part I—Some Practical Design Considerations.” IEEE Transactions on Circuit Theory CT–18 (May, 1971). Tow, J. “A Step-by-Step Active Filter Design.” IEEE Spectrum 6 (December, 1969). Williams, A. B. Active Filter Design. Dedham, Massachusetts: Artech House, 1975. ———————-. “Q-Multiplier Techniques Increases Filter Selectivity.” EDN (October 5, 1975): 74–76. Zverev, A. I., Handbook of Filter Synthesis, John Wiley and Sons, New York, 1967.
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BANDPASS FILTERS
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Source: ELECTRONIC FILTER DESIGN HANDBOOK
CHAPTER 6
BAND-REJECT FILTERS
6.1 LC BAND-REJECT FILTERS Normalization of a band-reject requirement and the definitions of the response shape parameters were discussed in Section 2.1. Like bandpass filters, band-reject networks can also be derived from a normalized low-pass filter by a suitable transformation. In Section 5.1, we discussed the design of wideband bandpass filters by cascading a low-pass filter and a high-pass filter. In a similar manner, wideband band-reject filters can also be obtained by combining low-pass and high-pass filters. Both the input and output terminals are paralleled, and each filter must have a high input and output impedance in the band of the other filter to prevent interaction. Therefore, the order n must be odd and the first and last branches should consist of series elements. These restrictions make the design of band-reject filters by combining low-pass and high-pass filters undesirable. The impedance interaction between filters is a serious problem unless the separation between cutoffs is many octaves, so the design of band-reject filters is best approached by transformation techniques.
The Band-Reject Circuit Transformation Bandpass filters were obtained by first designing a low-pass filter with a cutoff frequency equivalent to the required bandwidth and then resonating each element to the desired center frequency. The response of the low-pass filter at DC then corresponds to the response of the bandpass filter at the center frequency. Band-reject filters are designed by initially transforming the normalized low-pass filter into a high-pass network with a cutoff frequency equal to the required bandwidth, and at the desired impedance level. Every high-pass element is then resonated to the center frequency in the same manner as bandpass filters. This corresponds to replacing the frequency variable in the high-pass transfer function by a new variable, which is given by fbr f0 a
f0 f b f0 f
(6-1)
As a result, the response of the high-pass filter at DC is transformed to the band-reject network at the center frequency. The bandwidth response of the band-reject filter is identical to the frequency response of the high-pass filter. The high-pass to band-reject transformation is shown in Figure 6-1. Negative frequencies, of course, are strictly of theoretical interest, so only the response shape corresponding to positive frequencies is applicable. As in the case of bandpass filters, the response curve exhibits geometric symmetry. 239 Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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FIGURE 6-1 The band-reject transformation: (a) high-pass filter response; and (b) transformed band-reject filter response.
The design procedure can be summarized as follows: 1. Normalize the band-reject filter specification and select a normalized low-pass filter that provides the required attenuation within the computed steepness factor. 2. Transform the normalized low-pass filter to a normalized high-pass filter. Then scale the high-pass filter to a cutoff frequency equal to the desired bandwidth and to the preferred impedance level. 3. Resonate each element to the center frequency by introducing a capacitor in series with each inductor and an inductor in parallel with each capacitor to complete the design. The transformed circuit branches are summarized in Table 6-1. All-Pole Band-Reject Filters. Band-reject filters can be derived from any all-pole or elliptic-function LC low-pass network. Although not as efficient as elliptic-function filters, the all-pole approach results in a simpler band-reject structure where all sections are tuned to the center frequency. The following example demonstrates the design of an all-pole band-reject filter. Example 6-1
Design of an All-Pole LC Band-Reject Filter
Required:
Band-reject filter A center frequency of 10 kHz 3 dB at 250 Hz (9.75 kHz, 10.25 kHz)
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241
TABLE 6-1 The High-Pass to Band-Reject Transformation
30-dB minimum at 100 Hz (9.9 kHz, 10.1 kHz) A source and load impedance of 600 Result:
(a) Convert to a geometrically symmetrical requirement. Since the bandwidth is relatively narrow, the specified arithmetically symmetrical frequencies will determine the following design parameters: f0 10 kHz BW3 dB 500 Hz BW30 dB 200 Hz (b) Compute the band-reject steepness factor. As
passband bandwidth 500 Hz 2.5 200 Hz stopband bandwidth
(2-20)
The response curves of Figure 2-45 indicate that an n 3 Chebyshev normalized low-pass filter having a 1-dB ripple provides over 30 dB of attenuation within a frequency ratio of 2.5:1. The corresponding circuit is found in Table 11-31 and is shown in Figure 6-2a. (c) To transform the normalized low-pass circuit into a normalized high-pass filter, replace inductors with capacitors and vice versa using reciprocal element values. The transformed structure is shown in Figure 6-2b.
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FIGURE 6-2 The band-reject filter of Example 6-1: (a) normalized low-pass filter; (b) transformed normalized high-pass filter; (c) frequency- and impedance-scaled high-pass filter; (d) transformed band-reject filter; and (e) frequency response.
(d) The normalized high-pass filter is scaled to a cutoff frequency of 500 Hz corresponding to the desired bandwidth and to an impedance level of 600 . The capacitors are divided by Z FSF and the inductors are multiplied by Z/FSF, where Z is 600 and the FSF (frequency-scaling factor) is given by 2pfc, where fc is 500 Hz. The scaled high-pass filter is illustrated in Figure 6-2c.
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(e) To make the high-pass to band-reject transformation, resonate each capacitor with a parallel inductor and each inductor with a series capacitor. The resonating inductors for the series branches are both given by L
1 1 1.06 mH v20C (2p10 103)2 0.239 106
(6-2)
The tuning capacitor for the shunt inductor is determined from C
1 1 1450 pF v20L (2p10 103)2 0.175
(6-3)
The final filter is shown in Figure 6-2d, where all peaks are tuned to the center frequency of 10 kHz. The theoretical frequency response is illustrated in Figure 6-2e. When a low-pass filter undergoes a high-pass transformation, followed by a band-reject transformation, the minimum Q requirement is increased by a factor equal to the Q of the band-reject filter. This can be expressed as Qmin (band-reject) Qmin (low-pass) Qbr
(6-8)
where values for Qmin (low-pass) are given in Figure 3-8 and Qbr f0 /BW3 dB. The branch Q should be several times larger than Qmin (band-reject) to obtain near-theoretical results. The equivalent circuit of a band-reject filter at the center frequency can be determined by replacing each parallel tuned circuit by a resistor of v0LQ L and each series tuned circuit by a resistor of v0L/Q L. These resistors correspond to the branch impedances at resonance, where v0 is 2pf0, L is the branch inductance, and QL is the branch Q, which is normally determined only by the inductor losses. It is then apparent that at the center frequency, the circuit can be replaced by a resistive voltage divider. The amount of attenuation that can be obtained is then directly controlled by the branch Qs. Let’s determine the attenuation of the circuit of Example 6-1 for a finite value of inductor Q. Example 6-2
Estimate Maximum Band-Reject Rejection as a Function of Q
Required:
Estimate the amount of rejection obtainable at the center frequency of 10 kHz for the band-reject filter of Example 6-1. An inductor Q of 100 is available and the capacitors are assumed to be lossless. Also determine if the Q is sufficient to retain the theoretical passband characteristics. Result:
(a) Compute the equivalent resistances at resonance for all tuned circuits. Parallel tuned circuits:
R v0LQ L 2p 104 1.06 103 100 6660
(5-21)
Series tuned circuits:
R
v0L 2p 104 0.175 110 QL 100
(5-30)
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FIGURE 6-3 The equivalent circuit at the center frequency for the filter of Figure 6-2.
(b) The equivalent circuit at 10 kHz is shown in Figure 6-3. Using conventional circuit analysis methods such as mesh equations or approximation techniques, the overall loss is found to be 58 dB. Since the flat loss due to the 600- terminations is 6 dB, the relative attenuation at 10 kHz will be 52 dB. (c) The curves of Figure 3-8 indicate that an n 3 Chebyshev filter with a 1-dB ripple has a minimum theoretical Q requirement of 4.5. The minimum Q of the bandreject filter is given by Q min(band-reject) Q min(low-pass) Q br 4.5
10,000 90 500
(6-8)
Therefore, the available Q of 100 is barely adequate, and some passband rounding will occur in addition to the reduced stopband attenuation. The resulting effect on frequency response is shown in Figure 6-4.
FIGURE 6-4 The effects of insufficient Q upon a bandreject filter.
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Elliptic-Function Band-Reject Filters. The superior properties of the elliptic-function family of filters can also be applied to band-reject requirements. Extremely steep characteristics in the transition region between passband and stopband can be achieved much more efficiently than with all-pole filters. Saal and Ulbrich, as well as Zverev (see Bibliography), have extensively tabulated the LC values for normalized elliptic-function low-pass networks. Using the Filter Solutions program or the ELI 1.0 program, low-pass filters can be directly designed using the filter requirements as the program input rather than engaging normalized tables. These circuits can then be transformed to high-pass filters, and subsequently to a band-reject filter in the same manner as the all-pole filters. Since each normalized low-pass filter can be realized in dual forms, the resulting bandreject filters can also take on two different configurations, as illustrated in Figure 6-5. Branch 2 of the standard band-reject filter circuit corresponds to the type III network shown in Table 6-1. This branch provides a pair of geometrically related zeros, one above and one below the center frequency. These zeros result from two conditions of parallel resonance. However, the circuit configuration itself is not very desirable. The elements corresponding to the individual parallel resonances are not distinctly isolated since each
FIGURE 6-5 The band-reject transformation of elliptic-function filters: (a) standard configuration; and (b) dual configuration.
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FIGURE 6-6 The equivalent circuit of a type III network.
resonance is determined by the interaction of a number of elements. This makes tuning somewhat difficult. For very narrow filters, the element values also become somewhat unreasonable. An identical situation occurred during the bandpass transformation of an elliptic-function low-pass filter discussed in Section 5.1. An equivalent configuration was presented as an alternate and is repeated in Figure 6-6. The type III network of Figure 6-6 has reciprocal element values which occur when the band-reject filter has been normalized to a 1-rad/s center frequency since the equation of resonance, v20 LC 1, then reduces to LC 1. The reason for this normalization is to greatly simplify the transformation equations. To normalize the band-reject filter circuit, first transform the normalized low-pass filter to a normalized high-pass configuration in the conventional manner by replacing inductors with capacitors and vice versa using reciprocal element values. The high-pass elements are then multiplied by the factor Qbr, which is equal to f0 /BW, where f0 is the geometric center frequency of the band-reject filter and BW is the bandwidth. The normalized band-reject filter can be directly obtained by resonating each inductor with a series capacitor and each capacitor with a parallel inductor using reciprocal values. To make the transformation of Figure 6-6, first compute b1
1 1 1 Å 4L 21C 21 L 1C1 2L 1C1
(6-9)
The values are then found from La
1 C1(b 1)
(6-10)
L b bL a
(6-11)
Ca
1 Lb
(6-12)
Cb
1 La
(6-13)
The resonant frequencies for each tuned circuit are given by
and
`, a 2b
(6-14)
1 `, a
(6-15)
`, b
After the normalized band-reject filter has undergone the transformation of Figure 6-6 wherever applicable, the circuit can be scaled to the desired impedance level and frequency. The inductors are multiplied by Z/FSF, and capacitors are divided by Z FSF. The value Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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FIGURE 6-7 The equivalent circuit of the type IV network.
of Z is the desired impedance level, and the frequency-scaling factor (FSF) in this case is equal to v0 (v0 2pf0). The resulting resonant frequencies in hertz are determined by multiplying the normalized radian resonant frequencies by f0. Branch 2 of the band-reject filter derived from the dual low-pass structure of Figure 6-5b corresponds to the type IV network of Table 6-1. This configuration realizes a pair of finite zeros resulting from two conditions of series resonance. However, as in the case of the type III network, the individual resonances are determined by the interaction of all the elements, which makes tuning difficult and can result in unreasonable values for narrow filters. An alternate configuration is shown in Figure 6-7 consisting of two series resonant circuits in parallel. To simplify the transformation equations, the type IV network requires reciprocal values, so the band-reject filter must be normalized to a 1-rad/s center frequency. This is accomplished as previously described, and the filter is subsequently denormalized after the transformations have been made. The transformation is accomplished as follows: First, compute b1
1 1 1 Å 4L 21C 21 L 1C1 2L 1C1
(6-16)
then (b 1)L 1 b 1 Ca (b 1)L 1 1 Lb c a La
Cb
1 La
(6-17) (6-18) (6-19) (6-20)
`, a 2b
(6-21)
1 `, a
(6-22)
`, b
The standard configuration of the elliptic-function filter is usually preferred over the dual circuit so that the transformed low-pass zeros can be realized using the structure of Figure 6-6. Parallel tuned circuits are generally more desirable than series tuned circuits Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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since they can be transformed to alternate L/C ratios to optimize Q and reduce capacitor values (see Section 8.2 on tapped inductors). Example 6-3
Design of an LC Elliptic Function Band-Reject Filter
Required:
Design a band-reject filter to satisfy the following requirements: 1-dB maximum at 2200 and 2800 Hz 50-dB minimum at 2300 and 2700 Hz A source and load impedance of 600 Result:
(a) Convert to a geometrically symmetrical requirement. First, calculate the geometric center frequency. f0 2fL fu 22200 2800 2482 Hz
(2-14)
Compute the corresponding geometric frequency for each stopband frequency given using Equation (2-18). f1 f2 f 20
(2-18)
f1
f2
f2 f1
2300 Hz 2282 Hz
2678 Hz 2700 Hz
378 Hz 418 Hz
The second pair of frequencies is retained since they represent the steeper requirement. The complete geometrically symmetrical specification can be stated as f0 2482 Hz BW1 dB 600 Hz BW50 dB 418 Hz (b) Compute the band-reject steepness factor. As
passband bandwidth 600 Hz 1.435 418 Hz stopband bandwidth
(2-20)
A normalized low-pass filter must be chosen that makes the transition from less than 1 dB to more than 50 dB within a frequency ratio of 1.435. An elliptic-function filter will be used. (c) Open Filter Solutions. Check the Stop Band Freq box. Enter .18 in the Pass Band Ripple (dB) box. Enter 1 in the Pass Band Freq box. Enter 1.435 in the Stop Band Freq box. The Frequency Scale Rad/Sec box should be checked. Enter 1 for Source Res and Load Res.
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(d ) Click the Set Order control button to open the second panel. Enter 50 for the Stopband Attenuation (dB). Click the Set Minimum Order button and then click Close. 6 Order is displayed on the main control panel. Check the Even Order Mod box. (e) Click the Circuits button. Two schematics are presented by Filter Solutions. Use Passive Filter 1, which is shown in Figure 6-8a. ( f ) The normalized low-pass filter is now transformed into a normalized high-pass structure by replacing all inductors with capacitors, and vice versa, using reciprocal values. The resulting filter is given in Figure 6-8b. (g) To obtain a normalized band-reject filter so that the transformation of Figure 6-6 can be performed, first multiply all the high-pass elements by Qbr, which is given by Q br
f0 2482 Hz 4.137 BW1 dB 600 Hz
The modified high-pass filter is shown in Figure 6-8c. (h) Each high-pass inductor is resonated with a series capacitor, and each capacitor is resonated with a parallel inductor to obtain the normalized band-reject filter. Since the center frequency is 1 rad/s, the resonant elements are simply the reciprocal of each other, as illustrated in Figure 6-8d. (i) The type III networks of the second and fourth branches are now transformed to the equivalent circuit of Figure 6-6 as follows: The type III network of third branch:
L 1 11.428 H C1 3.270 F b1
1 1 1 1.1775 Å 4L 21C 21 L 1C1 2L 1C1 La
1 0.1404 H C1(b 1)
L b bL a 0.1654 H
(6-9) (6-10) (6-11)
Ca
1 6.047 F Lb
(6-12)
Cb
1 7.1205 F La
(6-13)
`, a 2b 1.0851
(6-14)
1 0.92155 `, a
(6-15)
`, b
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CHAPTER SIX
1 F 1.151
1 F 1.265
1 F 1.269
1 H 0.362
1 H 0.206
1Ω
1Ω 1 H 1.438
1 H 1.281
1 H 0.9674
(b)
3.270 F
3.260 F
11.428 H
20.08 H
3.5943 F
1Ω
3.230 H
2.8769 H
4.2764 H
1Ω
(c) 1 3.270 1 3.5943
1
H
3.260
H
H
1 3.5943 F
3.230
3.270 F
1Ω 3.230 H
11.428 H
3.260 F
1
F 1 11.428
2.8769
1
F
F
20.08 H
2.8769 H
1 20.08
F
4.2764
F 1Ω
4.2764 H
(d)
FIGURE 6-8 elliptic-function band-reject filter: (a) normalized low-pass filter; (b) transformed high-pass filter; (c) high-pass filter with elements multiplied by Qbr; and (d) normalized band-reject filter.
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BAND-REJECT FILTERS 1 3.5943
H
3.5943 F 1 1Ω
3.230
0.1404 H
0.1654 H
0.1439 H
0.1628 H
6.047 F
7.1205 F
6.1412 F
6.9486 F
1
F
2.8769
3.230 H
1.00
1
F
4.2764
2.8769 H
1.00
1.0851
0.92155
F
1Ω
4.2764 H
1.00
1.0637
0.94011
1.00
(e)
600 Ω
10.7 mH
5.402 mH
6.364 mH
5.536 mH
6.264 mH
0.3841 uF
0.6463 uF
0.7510 uF
0.6563 uF
0.7426 uF
0.03309 uF
0.03715 uF
0.0250 uF
124.3 mH
110.7 mH
4.2764 H
2482 Hz
2482 Hz 2694 Hz
2287 Hz 2482 Hz 2641 Hz
2333 Hz
600 Ω
2482 Hz
(f)
FIGURE 6-8 (Continued) elliptic-function band-reject filter: (e) transformed type III network; ( f ) frequency- and impedance-scaled circuit; and (g) frequency response.
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CHAPTER SIX The type III network of fourth branch:
L 1 20.08 H C1 3.260 F b 1.13147 L a 0.1439 H L b 0.1628 H Ca 6.1412 F Cb 6.9486 F `, a 1.0637 v`, b 0.94011 The resulting normalized band-reject filter is shown in Figure 6-8e. ( j) The final filter can now be obtained by frequency- and impedance-scaling the normalized band-reject filter to a center frequency of 2482 Hz and 600 . The inductors are multiplied by Z/FSF, and the capacitors are divided by Z FSF, where Z is 600 and the FSF is 2pf0, where f0 is 2482 Hz. The circuit is given in Figure 6-8f, where the resonant frequencies of each section were obtained by multiplying the normalized frequencies by f0. The frequency response is illustrated in Figure 6-8g. Null Networks. A null network can be loosely defined as a circuit intended to reject a single frequency or a very narrow band of frequencies, and is frequently referred to as a trap. Notch depth rather than rate of roll-off is the prime consideration, and the circuit is restricted to a single section. Parallel Resonant Trap. The RC high-pass circuit of Figure 6-9a has a 3-dB cutoff given by fc
1 2pRC
(6-23)
A band-reject transformation will result in the circuit of Figure 6-9b. The value of L is computed from L
1 v20C
(6-24)
where v0 2pf0. The center frequency is f0 and the 3-dB bandwidth is fc.
FIGURE 6-9 A parallel resonant trap: (a) RC high-pass filter; (b) results of a band-reject transformation; and (c) equivalent circuit at f0.
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The frequency response of a first-order band-reject filter can be expressed as AdB 10 log c1 a
BW3 dB 2 b d BWx dB
(6-25)
where BW3 dB is the 3-dB bandwidth corresponding to fc in Equation (6-23), and where BWx dB is the bandwidth of interest. The response can also be determined from the normalized Butterworth attenuation curves of Figure 2-34 corresponding to n 1, where BW3 dB/BWx dB is the normalized bandwidth. The impedance of a parallel tuned circuit at resonance is equal to v0LQ L, where QL is the inductor Q and the capacitor is assumed to be lossless. We can then represent the band-reject filter at f0 by the equivalent circuit of Figure 6-9c. After some algebraic manipulation involving Equations (6-23) and (6-24) and the circuit of Figure 6-9c, we can derive the following expression for the attenuation at resonance of the n 1 band-reject filter of Figure 6-9: AdB 20 loga
QL 1b Q br
(6-26)
where Qbr f0 /BW3 dB. Equation (6-26) is plotted in Figure 6-10. When Qbr is high, the required inductor Q may become prohibitively large in order to attain sufficient attenuation at f0. The effect of insufficient inductor Q will not only reduce relative attenuation, but will also cause some rounding of the response near the cutoff frequencies. Therefore, the ratio QL/Qbr should be as high as possible.
FIGURE 6-10
Attenuation vs. QL/Qbr.
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Example 6-4
Designing a Parallel Resonant Trap
Required:
Design a parallel resonant circuit which has a 3-dB bandwidth of 500 Hz and a center frequency of 7500 Hz. The source resistance is zero and the load is 1 k. Also determine the minimum inductor Q for a relative attenuation of at least 30 dB at 7500 Hz. Result:
(a) Compute the value of the capacitor from C
1 1 0.3183 F 2pfcR 2p500 1000
(6-23)
The inductance is given by L
1 1 1.415 mH v20C (2p7500)2 3.183 107
(6-24)
The resulting circuit is shown in Figure 6-11. (b) The required ratio of QL/Qbr for 30-dB attenuation at f0 can be determined from Figure 6-10 or Equation (6-26), and is approximately 30. Therefore, the inductor Q should exceed 30 Qbr or 450, where Qbr f0 /BW3 dB. Frequently it is desirable to operate the band-reject network between equal source and load terminations instead of a voltage source, as in Figure 6-9. If a source and load resistor are specified where both are equal to R, Equation (6-23) is modified to fc
FIGURE 6-11 The parallel resonant trap of Example 6-4.
1 4pRC
(6-27)
When the source and load are unequal, the cutoff frequency is given by fc
1 2p(Rs RL)C
(6-28)
Series Resonant Trap. An n 1 band-reject filter can also be derived from the RL high-pass filter of Figure 6-12a. The 3-dB cutoff is determined from fc
R 2pL
(6-29)
The band-reject filter of Figure 6-12b is obtained by resonating the coil with a series capacitor where C
1 v20L
(6-24)
The center frequency is f0 and the 3-dB bandwidth is equal to fc. The series losses of an inductor can be represented by a resistor of v0 L/Q L. The equivalent circuit of the band-reject
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BAND-REJECT FILTERS
FIGURE 6-12 A series resonant trap: (a) RL high-pass filter; (b) result of band-reject transformation; and (c) equivalent circuit at f0.
network at resonance is given by the circuit of Figure 6-12c and the attenuation computed from Equation (6-26) or Figure 6-10. Example 6-5
Designing a Series Resonant Trap
Required:
Design a series resonant circuit having a 3-dB bandwidth of 500 Hz and a center frequency of 7500 Hz, as in the previous example. The source impedance is 1 k and the load is assumed infinite. Result:
Compute the element values from the following relationships: 1000 R 0.318 H 2pfc 2p500
(6-29)
1 1 1420 pF v20L (2p7500)20.318
(6-24)
L and
C
The circuit is given in Figure 6-13. When a series resonant trap is to be terminated with a load resistance equal to the source, the high-pass 3-dB cutoff and resulting 3-dB bandwidth of the band-reject filter are given by fc
R 4pL
(6-30)
For the more general case where source and load are unequal, the cutoff frequency is determined from fc
Req 2pL
(6-31)
FIGURE 6-13 The series resonant trap of Example 6-5.
where Req is the equivalent value of the source and load resistors in parallel. The Bridged-T Configuration. The resonant traps previously discussed suffer severe degradation of notch depth unless an inductor Q is many magnitudes greater than Qbr. The bridged-T band-reject structure can easily provide rejection of 60 dB or more with practical values of inductor Q. The configuration is shown in Figure 6-14a.
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To understand the operation of the circuit, let us first consider the equivalent circuit of a center-tapped inductor having a coefficient of magnetic coupling equal to unity, which is shown in Figure 6-14b. The inductance between terminals A and C corresponds to L of Figure 6-14a. The inductance between A and B or B and C is equal to L/4 since, as the reader may recall, the impedance across one-half of a center-tapped autotransformer is one-fourth the overall impedance. This occurs because the impedance is proportional to the turns ratio squared. The impedance of a parallel tuned circuit at resonance was previously determined to be equivalent to a resistor of v0 LQ L. Since the circuit of Figure 6-14a is center-tapped, the equivalent three-terminal network is shown in Figure 6-14c. The impedance between A and C is still v0 LQ L. A negative resistor must then exist in the middle shunt branch so that the impedance across one half of the tuned circuit is one-fourth the overall impedance, or v0 LQ L/4. Of course, negative resistors or inductors are physically impossible as individual passive two-terminal elements, but they can be embedded within an equivalent circuit. If we combine the equivalent circuit of Figure 6-14c with the bridged-T network of Figure 6-14a, we obtain the circuit of Figure 6-14d. The positive and negative resistors in the center branch will cancel, resulting in infinite rejection of center frequency. The degree of rejection actually obtained is dependent upon a variety of factors such as center-tap accuracy, the coefficient of coupling, and the magnitude of QL. When the bridgedT configuration is implemented after modifying a parallel trap design of Figure 6-9b by adding a center tap and a resistor of v0 LQ L/4, a dramatic improvement in notch depth will usually occur. A center-tapped inductor is not always available or practical. An alternate form of a bridged-T is given in Figure 6-15. The parallel resonant trap design of Figure 6-9 is modified
FIGURE 6-14 A bridged-T null network: (a) circuit configuration; (b) equivalent circuit of center-tapped inductor; (c) tuned circuit equivalent at resonance; and (d) bridged-T equivalent circuit at resonance.
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FIGURE 6-15
257
An alternate form of bridged-T.
by splitting the capacitor into two capacitors of twice the value, and a resistor of v0 LQ L/4 is introduced. The two capacitors should be closely matched. In conclusion, the bridged-T structure is an economical and effective means of increasing the available notch rejection of a parallel resonant trap without increasing the inductor Q. However, as a final general comment, a single null section can provide high rejection only at a single frequency or relatively narrow band of frequencies for a given 3-dB bandwidth, since n 1. The stability of the circuit then becomes a significant factor. A higherorder band-reject filter design can have a wider stopband and yet maintain the same 3-dB bandwidth.
6.2 ACTIVE BAND-REJECT FILTERS This section considers the design of active band-reject filters for both wideband and narrowband applications. Active null networks are covered, and the popular twin-T circuit is discussed in detail.
Wideband Active Band-Reject Filters Wideband filters can be designed by first separating the specification into individual lowpass and high-pass requirements. Low-pass and high-pass filters are then independently designed and combined by paralleling the inputs and summing both outputs to form the band-reject filter. A wideband approach is valid when the separation between cutoffs is an octave or more for all-pole filters so that minimum interaction occurs in the stopband when the outputs are summed (see Section 2.1 and Figure 2-13). Elliptic-function networks will require less separation since their characteristics are steeper. An inverting amplifier is used for summing and can also provide gain. Filters can be combined using the configuration of Figure 6-16a, where R is arbitrary and A is the desired gain. The individual filters should have a low output impedance to avoid loading by the summing resistors. The VCVS elliptic-function low-pass and high-pass filters of Sections 3.2 and 4.2 each require an RC termination on the last stage to provide the real pole. These elements can be combined with the summing resistors, resulting in the circuit of Figure 6-16b. Ra and Ca correspond to the denormalized values of R5 for the low-pass filter of Figure 3-20. The denormalized high-pass filter real-pole values are Rb and Cb. If only one filter is of the VCVS type, the summing network of the filter having the low output impedance can be replaced by a single resistor having a value of R.
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FIGURE 6-16 Wideband band-reject filters: (a) the combining of filters with low output impedance; and (b) combined filters requiring RC real poles.
When one or both filters are of the elliptic-function type, the ultimate attenuation obtainable is determined by the filter having the lesser value of Amin since the stopband output is the summation of the contributions of both filters. Example 6-6
Design of a Wideband Band-Reject Filter
Required:
Design an active band-reject filter having 3-dB points at 100 and 400 Hz, and greater than 35 dB of attenuation between 175 and 225 Hz. Result:
(a) Since the ratio of upper cutoff to lower cutoff is well in excess of an octave, a wideband approach can be used. First, separate the specification into individual lowpass and high-pass requirements. Low-pass: High-pass: 3 dB at 100 Hz 3 dB at 400 Hz 35-dB minimum at 175 Hz 35-dB minimum at 225 Hz (b) The low-pass and high-pass filters can now be independently designed as follows: Low-pass filter:
Compute the steepness factor. As
fs 175 Hz 1.75 100 Hz fc
(2-11)
An n 5 Chebyshev filter having a 0.5-dB ripple is chosen using Figure 2-44. The normalized active low-pass filter values are given in Table 11-39, and the circuit is shown in Figure 6-17a.
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259
FIGURE 6-17 The wideband band-reject filter of Example 6-6: (a) normalized low-pass filter; (b) denormalized low-pass filter; (c) transformed normalized high-pass filter; and (d) denormalized high-pass filter.
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FIGURE 6-17
(Continued) The wideband band-reject filter of Example 6-6: (e) combining filters to obtain a band-reject response.
BAND-REJECT FILTERS
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261
To denormalize the filter, multiply all resistors by Z and divide all capacitors by Z FSF, where Z is conveniently selected at 105 and the FSF is 2pfc, where fc is 100 Hz. The denormalized low-pass filter is given in Figure 6-17b. High-pass filter:
Compute the steepness factor. As
fc 400 Hz 1.78 fs 225 Hz
(2-13)
An n 5 Chebyshev filter with a 0.5-dB ripple will also satisfy the high-pass requirement. A high-pass transformation can be performed on the normalized lowpass filter of Figure 6-17a to obtain the circuit of Figure 6-17c. All resistors have been replaced with capacitors and vice versa using reciprocal element values. The normalized high-pass filter is then frequency- and impedance-scaled by multiplying all resistors by Z and dividing all capacitors by Z FSF, where Z is chosen at 105 and FSF is 2pfc, using an fc of 400 Hz. The denormalized high-pass filter is shown in Figure 6-17d using standard 1-percent resistor values. (c) The individual low-pass and high-pass filters can now be combined using the configuration of Figure 6-16a. Since no gain is required, A is set equal to unity. The value of R is conveniently selected at 10 k, resulting in the circuit of Figure 6-17e. Band-Reject Transformation of Low-Pass Poles. The wideband approach to the design of band-reject filters using combined low-pass and high-pass networks is applicable to bandwidths of typically an octave or more. If the separation between cutoffs is insufficient, interaction in the stopband will occur, resulting in inadequate stopband rejection (see Figure 2-13). A more general approach involves normalizing the band-reject requirement and selecting a normalized low-pass filter type that meets these specifications. The corresponding normalized low-pass poles are then directly transformed to the band-reject form and realized using active sections. A band-reject transfer function can be derived from a low-pass transfer function by substituting the frequency variable f by a new variable given by fbr
1 f0 f f0 a b f0 f
(6-32)
This transformation combines the low-pass to high-pass and subsequent band-reject transformation discussed in Section 6.1 so that a band-reject filter can be obtained directly from the low-pass transfer function. The band-reject transformation results in two pairs of complex poles and a pair of secondorder imaginary zeros from each low-pass complex pole pair. A single low-pass real pole is transformed into a complex pole pair and a pair of first-order imaginary zeros. These relationships are illustrated in Figure 6-18. The zeros occur at center frequency and result from the transformed low-pass zeros at infinity. The band-reject pole-zero pattern of Figure 6-18a corresponds to two band-reject sections where each section provides a zero at center frequency and also provides one of the pole pairs. The pattern of Figure 6-18b is realized by a single band-reject section where the zero also occurs at the center frequency.
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FIGURE 6-18 The band-reject transformation of low-pass poles: (a) lowpass complex pole pair; and (b) low-pass real pole.
To make the low-pass to band-reject transformation, first compute Q br
f0 BW
(6-33)
where f0 is the geometric center frequency and BW is the passband bandwidth. The transformation then proceeds as follows in the next section for complex poles and real poles. Complex Poles. The tables of Chapter 11 contain tabulated poles corresponding to the all-pole low-pass filter families discussed in Chapter 2. Complex poles are given in the form a jb, where a is the real coordinate and b is the imaginary part. Given a, b, Qbr, and f0, the following computations [see Equations (6-34) through (6-44)] result in two sets of values for Q and frequency which defines two band-reject filter sections. Each section also has a zero at f0. C a2 b2 D
a Q brC
(6-35)
E
b Q brC
(6-36)
F E 2 D2 4 G
(6-34)
F Å2
F2 D 2E 2 Ç 4
(6-37) (6-38)
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H K
DE G
1 2(D H)2 (E G)2 2 K Q DH f0 fra K frb Kf0 f` f0
263
(6-39) (6-40) (6-41) (6-42) (6-43) (6-44)
The two band-reject sections have resonant frequencies of fra and frb (in hertz) and identical Qs given by Equation (6-41). In addition, each section has a zero at f0, the filter geometric center frequency. Real Poles. A normalized low-pass real pole having a real coordinate of a0 is transformed into a single band-reject section having a Q given by Q Q bra0
(6-45)
This section resonant frequency is equal to f0. The section must also have a transmission zero at f0. Example 6-7
Calculating Pole and Zero Locations for a Band-Reject Filter
Required:
Determine the pole and zero locations for a band-reject filter having the following specifications: A center frequency of 3600 Hz 3 dB at 150 Hz 40-dB minimum at 30 Hz Result:
(a) Since the filter is narrow, the requirement can be treated directly in its arithmetically symmetrical form: f0 3600 Hz BW3 dB 300 Hz BW40 dB 60 Hz The band-reject steepness factor is given by As
passband bandwidth 300 Hz 5 stopband bandwidth 60 Hz
(2-20)
(b) An n 3 Chebyshev normalized low-pass filter having a 0.1-dB ripple is selected using Figure 2-42. The corresponding pole locations are found in Table 11-23 and are 0.3500 j0.8695 0.6999
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First, make the preliminary computation using Q br
f0 3600 Hz 12 BW3 dB 300 Hz
(6-33)
The low-pass to band-reject pole transformation is performed as follows: Complex-pole transformation:
a 0.3500 b 0.8695 C a 2 b 2 0.878530 D
a 0.033199 Q brC
(6-35)
E
b 0.082477 Q brC
(6-36)
F E 2 D 2 4 4.005700 G
F Å2
Ç
H K
(6-34)
F2 D 2E 2 2.001425 4
DE 0.001368 G
1 2(D H)2 (E G)2 1.042094 2 K 30.15 Q DH
(6-37) (6-38) (6-39) (6-40) (6-41)
f0 3455 Hz K
(6-42)
frb Kf0 3752 Hz
(6-43)
f` f0 3600 Hz
(6-44)
fra
Real-pole transformation:
a0 0.6999 Q Q bra0 8.40
(6-45)
fr f` f0 3600 Hz The block diagram is shown in Figure 6-19.
FIGURE 6-19
The block diagram of Example 6-7.
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Narrowband Active Band-Reject Filters. Narrowband active band-reject filters are designed by first transforming a set of normalized low-pass poles to the band-reject form. The band-reject poles are computed in terms of resonant frequency fr, Q, and f` using the results of section 6.2 and are then realized with active band-reject sections. The VCVS Band-Reject Section. Complex low-pass poles result in a set of band-reject parameters where fr and f` do not occur at the same frequency. Band-reject sections are then required that permit independent selection of fr and f` in their design procedure. Both the VCVS and biquad circuits covered in Section 5.2 under “Elliptic-Function Bandpass Filters” have this degree of freedom. The VCVS realization is shown in Figure 6-20. The design equations were given in Section 5.2 under. “Elliptic-Function Bandpass Filters” and are repeated here for convenience, where fr, Q, and f` are obtained by the band-reject transformation procedure of Section 6.2. The values are computed as follows: First, calculate a
1 Q
(6-46)
FIGURE 6-20 A VCVS realization for band-reject filters: (a) circuit for K 1; and (b) circuit for K 1.
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f` 2 b a b fr c 2pfr C1 C
Select C, then
C1 2 C1(b 1) C2 4 1 R3 cC1 2b C3 C4
R1 R2 2R3 R4 K2
4 2b cC1(1 b) 4cC2
2C2 a 2 1 a aC2 b C1 2 2b C1 2b cR4
R6 R
and
R7 (K 1)R
(6-47) (6-48) (6-49) (6-50) (6-51) (6-52) (6-53) (6-54) (6-55) (6-56)
where R can be arbitrarily chosen. The circuit of Figure 6-20a is used when K 1. In the cases where K 1, the configuration of Figure 6-20b is utilized, where R4a (1 K)R4
(6-57)
R4b KR4
(6-58)
and The section gain at DC is given by
Section gain
bKC1 4C2 C1
(6-59)
The gain of the composite filter in the passband is the product of the DC gains of all the sections. The VCVS structure has a number of undesirable characteristics. Although the circuit Q can be adjusted by making R6 or R7 variable when K 1, the Q cannot be independently measured since the 3-dB bandwidth at the output is affected by the transmission zero. Resonant frequency fr or the notch frequency f` cannot be easily adjusted since these parameters are determined by the interaction of a number of elements. Also, the section gain is fixed by the design parameters. Another disadvantage of the circuit is that a large spread in capacitor values* may occur so that standard values cannot be easily used. Nevertheless, the VCVS realization makes effective use of a minimum number of operational amplifiers in comparison with other implementations and is widely used. However, because of its lack of adjustment capability, its application is generally restricted to Qs below 10 and with 1-percent component tolerances. *The elliptic-function configuration of the VCVS uniform capacitor structure given in Section 3.2 can be used at the expense of additional sensitivity.
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FIGURE 6-21
267
biquad band-reject realization.
The State-Variable Band-Reject Section. The biquad or state-variable elliptic-function bandpass filter section discussed in Section 5.2 is highly suitable for implementing bandreject transfer functions. The circuit is given in Figure 6-21. By connecting resistor R5 to either node 1 or node 2, the notch frequency f` will be located above or below the pole resonant frequency fr. Section Qs of up to 200 can be obtained. The design parameters fr, Q, and f`, as well as the section gain, can be independently chosen, monitored, and adjusted. From the point of view of low sensitivity and maximum flexibility, the biquad approach is the most desirable method of realization. The design equations were stated in Section 5.2 under “Elliptic-Function Bandpass Filters” and are repeated here for convenience, where fr, Q, and f` are given and the values of C, R, and Rr can be arbitrarily chosen. Q 2pfrC R1 R2 R3 Q
R1 R4
R5 for f` fr: and when f` fr:
f 2r R
Qu f 2r f 2` u f 2r R R6 2 f` R6 R
(6-60) (6-61) (6-62) (6-63) (6-64)
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The value of R6 is based on unity section gain at DC. The gain can be raised or lowered by proportionally increasing or decreasing R6. Resonance is adjusted by monitoring the phase shift between the section input and node 3 using a Lissajous pattern and adjusting R3 for 180 phase shift with an input frequency of fr. The Q is controlled by R1 and can be measured at node 3 in terms of section 3-dB bandwidth, or R1 can be adjusted until unity gain occurs between the input and node 3 with fr applied. Because of the Q-enhancement effect discussed in Section 5.2 under “All-Pole Bandpass Configuration,” a Q adjustment is usually necessary. The notch frequency is then determined by monitoring the section output for a null. Adjustment is normally not required since the tuning of fr will usually bring in f` with acceptable accuracy. If an adjustment is desired, R5 can be made variable. Sections for Transformed Real Poles. When a real pole undergoes a band-reject transformation, the result is a single pole pair and a single set of imaginary zeros. Complex poles resulted in two sets of pole pairs and two sets of zeros. The resonant frequency fr of the transformed real pole is exactly equal to the notch frequency f`, thus the design flexibility of the VCVS and biquad structures is not required. A general second-order bandpass transfer function can be expressed as vr s Q (6-65) T(s) vr s 2 s v2r Q where the gain is unity at vr. If we realize the circuit of Figure 6-22 where T(s) corresponds to the above transfer function, the composite transfer function at the output is given by T(s)
s 2 v2r vr s 2 s v2r Q
(6-66)
This corresponds to a band-reject transfer function having a transmission zero at fr (that is, f` fr). The occurrence of this zero can also be explained intuitively from the structure of Figure 6-22. Since T(s) is unity at fr, both input signals to the summing amplifier will then cancel, resulting in no output signal. These results indicate that band-reject sections for transformed real poles can be obtained by combining any of the all-pole bandpass circuits of section 5.2 in the configuration of Figure 6-22. The basic design parameters are the required fr and Q of the band-reject section, which are directly used in the design equations for the bandpass circuits. By combining these bandpass sections with summing amplifiers, the three bandreject structures of Figure 6-23 can be derived. The design equations for the bandpass sections were given in Section 5.2 and are repeated here where C, R, and Rr can be arbitrarily chosen.
FIGURE 6-22 fr f`.
The band-reject configuration for
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FIGURE 6-23 The band-reject circuits for fr f`: (a) MFBP band-reject section (Q 20); (b) DABP band-reject section (Q 150); and (c) biquad band-reject section (Q 200).
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The MFBP band-reject section ( fr f`) is given by Q pfrC R2 R1a 2 R1a R1b 2Q 2 1 R2
(6-67) (6-68) (6-69)
The DABP band-reject section ( fr f`) is given by Q 2pfrC R1 R2 R3 Q R1
(6-70) (6-71)
The biquad band-reject section ( fr f`) is given by Q 2pfrC R1 R2 R3 Q
R1 R4
(6-72) (6-73)
These equations correspond to unity bandpass gain for the MFBP and biquad circuits so that cancellation at fr will occur when the section input and bandpass output signals are equally combined by the summing amplifiers. Since the DABP section has a gain of 2 and has a noninverting output, the circuit of Figure 6-23b has been modified accordingly so that cancellation occurs. Tuning can be accomplished by making R1b, R2, and R3 variable in the MFBP, DABP, and biquad circuits, respectively. In addition, the biquad circuit will usually require R1 to be made adjustable to compensate for the Q-enhancement effect (see Section 5.2 under “All-Pole Bandpass Configurations”). The circuit can be tuned by adjusting the indicated elements for either a null at fr measured at the circuit output or for 0 or 180 phase shift at fr observed between the input and the output of the bandpass section. If the bandpass section gain is not sufficiently close to unity for the MFBP and biquad case, and 2 for the DABP circuit, the null depth may be inadequate. Example 6-8
Design of an Active Band-Reject Filter
Required:
Design an active band-reject filter from the band-reject parameters determined in Example 6-7 having a gain of 6 dB. Result:
(a) The band-reject transformation in Example 6-7 resulted in the following set of requirements for a three-section filter:
Section
fr
Q
f`
1 2 3
3455 Hz 3752 Hz 3600 Hz
30.15 30.15 8.40
3600 Hz 3600 Hz 3600 Hz
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(b) Two biquad circuits in tandem will be used for sections 1 and 2 followed by a DABP band-reject circuit for section 3. The value of C is chosen at 0.01 F, and R, as well as Rr, at 10 k. Since the DABP section has a gain of 2 at DC, which satisfies the 6-dB gain requirement, both biquad sections should then have unity gain. The element values are determined as follows: Section 1 (biquad of Figure 6-21):
fr 3455 Hz Q 30.15 f` 3600 Hz R1 R4
Q 30.15 138.9 k 2pfrC 2p 3455 108
(6-60)
R1 138.9 103 4610 Q 30.15
(6-61)
R2 R3 R5
f 2r R
Q Z f 2r f 2` Z R6
f 2r R
34552 104 3870 30.15> Z 34552 36002 Z
f 2`
34552 104 9210 36002
(6-62) (6-63)
Section 2 (biquad of Figure 6-21):
fr 3752 Hz Q 30.15 f` 3600 Hz R1 R4 127.9 k
(6-60)
R2 R3 4240
(6-61)
R5 4180
(6-62)
R6 10 k
(6-64)
Section 3 (DABP of Figure 6-23):
fr f` 3600 Hz Q 8.40 R1
Q 8.40 37.1 k 2pfrC 2p 3600 108
R2 R3
R1 37.1 103 4420 Q 8.40
(6-70) (6-71)
The final circuit is shown in Figure 6-24 with standard 1-percent resistor values. The required resistors have been made variable so that the resonant frequencies can be adjusted for all sections and, in addition, the Q is variable for the biquad circuits. Active Null Networks. Active null networks are single sections used to provide attenuation at a single frequency or over a narrow band of frequencies. The most popular sections are of the twin-T form, so this circuit will be discussed in detail along with some other structures. The Twin-T. The twin-T was first discovered by H. W. Augustadt in 1934. Although this circuit is passive by nature, it is also used in many active configurations to obtain a variety of different characteristics. The circuit of Figure 6-25a is an RC bridge structure where balance or an output null occurs at 1 rad/s when all arms have an equal impedance (0.5 j0.5 ). The circuit is Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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FIGURE 6-24
CHAPTER SIX
The band-reject filter of Example 6-8.
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FIGURE 6-25 A derivation of the twin-T: (a) RC bridge; (b) lattice circuit; (c) parallel lattice; (d) twin-T equivalent; and (e) general form of twin-T.
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redrawn in the form of a symmetrical lattice in Figure 6-25b (refer to Guillemin and Stewart in Bibliography for detailed discussions of the lattice). The lattice of Figure 6-25b can be redrawn again in the form of two parallel lattices, as shown in Figure 6-25c. If identical series elements are present in both the series and shunt branches of a lattice, the element may be extracted and symmetrically placed outside the lattice structure. A 1- resistor satisfies the requirement for the upper lattice, and a 1-F capacitor for the lower lattice. Removal of these components to outside the lattice results in the twin-T of Figure 6-25d. The general form of a twin-T is shown in Figure 6-25e. The value of R1 is computed from R1
1 2pf0C
(6-74)
where C is arbitrary. This denormalizes the circuit of Figure 6-25d so that the null now occurs at f0 instead of at 1 rad/s. When a twin-T is driven from a voltage source and terminated in an infinite load,* the transfer function is given by T(s)
s 2 v20 s 2 4v0s v20
(6-75)
If we compare this expression with the general transfer function of a second-order polezero section as given by Equation (6-66), we can determine that a twin-T provides a notch at f0 with a Q of 1@4. The attenuation at any bandwidth can be computed by AdB 10 log c 1 a
4f0 2 b d BWx dB
(6-76)
The frequency response is shown in Figure 6-26, where the requirement for geometric symmetry applies. Twin-T with Positive Feedback The twin-T has gained widespread usage as a generalpurpose null network. However, a major shortcoming is a fixed Q of 1@4. This limitation can be overcome by introducing positive feedback. The transfer function of the circuit of Figure 6-27a can be derived as T(s)
b 1 K(b 1)
(6-77)
If b is replaced by Equation (6-75), the transfer function of a twin-T, the resulting circuit transfer function expression becomes T(s)
s 2 v20 s 4v0(1 K)s v20 2
(6-78)
The corresponding Q is then Q
1 4(1 K)
(6-79)
By selecting a positive K of 1 and sufficiently close to unity, the circuit Q can be dramatically increased. The required value of K can be determined by K1
1 4Q
(6-80)
*Since the source and load are always finite, the value of R1 should be in the vicinity of 2Rs RL, provided that the ratio RL/Rs is in excess of 10.
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FIGURE 6-26
The frequency response of a twin-T.
The block diagram of Figure 6-27a can be implemented using the circuit of Figure 6-27b, where R is arbitrary. By choosing C and R so that R1 W (1 K)R, the circuit may be simplified to the configuration of Figure 6-27c, which uses only one amplifier. The attenuation at any bandwidth is given by AdB 10 log c 1 a
2 f0 b d Q BWx dB
(6-81)
Equation (6-81) is the general expression for the attenuation of a single band-reject section where the resonant frequency and notch frequency are identical (that is, fr f`). The attenuation formula can be expressed in terms of the 3-dB bandwidth as follows: AdB 10 log c1 a
BW3 dB 2 b d BWx dB
(6-82)
The attenuation characteristics can also be determined from the frequency-response curve of a normalized n 1 Butterworth low-pass filter (see Figure 2-34) by using the ration BW3 dB/BWx dB for the normalized frequency. The twin-T in its basic form or in the positive-feedback configuration is widely used for single-section band-reject sections. However, it suffers from the fact that tuning cannot be easily accomplished. Tight component tolerances may then be required to ensure sufficient accuracy of tuning and adequate notch depth. About a 40- to 60-dB rejection at the notch could be expected using 1-percent components. Example 6-9
Designing a Twin-T Band-Reject Filter Using Positive Feedback
Required:
Design a single null network having a center frequency of 1000 Hz and a 3-dB bandwidth of 100 Hz. Also determine the attenuation at the 30-Hz bandwidth.
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FIGURE 6-27 Twin-T with positive feedback: (a) block diagram; (b) circuit realization; and (c) simplified configuration R 1 W (1 K )R. Result:
(a) A twin-T structure with positive feedback will be used. To design the twin-T, first choose a capacitance C of 0.01F. The value of R1 is given by R1
1 1 15.9 k 2pf0C 2p 103 108
(6-74)
(b) The required value of K for the feedback network is calculated from K1
1 1 1 0.975 4Q 4 10
(6-80)
where Q f0 /BW3 dB. (c) The single amplifier circuit of Figure 6-27c will be used. If R is chosen at 1 k, the circuit requirement for R1 W (1 K)R is satisfied. The resulting section is shown in Figure 6-28.
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FIGURE 6-28
277
The twin-T network of Example 6-9.
(d) To determine the attenuation at a bandwidth of 30 Hz, calculate AdB 10 log c 1 a
BW3 dB 2 100 Hz 2 b d 10 log c1 a b d 10.8 dB BWx dB 30 Hz
(6-82)
Bandpass Structure Null Networks. Section 6.2 under “Narrowband Active BandReject Filters” showed how a first-order bandpass section can be combined with a summing amplifier to obtain a band-reject circuit for transformed real poles, where fr f`. Three types of sections were illustrated in Figure 6-23, corresponding to different Q ranges of operation. These same sections can be used as null networks. They offer more flexibility than the twin-T since the null frequency can be adjusted to compensate for component tolerances. In addition, the DABP and biquad circuits permit Q adjustment as well. The design formulas were given by Equations (6-67) through (6-73). The values of fr and Q in the equations correspond to the section center frequency and Q, respectively. Frequently, a bandpass and band-reject output are simultaneously required. A typical application might involve the separation of signals for comparison of in-band and out-ofband spectral energy. The band-reject sections of Figure 6-23 can each provide a bandpass output from the bandpass section along with the null output signal. An additional feature of this technique is that the bandpass and band-reject outputs will track.
BIBLIOGRAPHY Guillemin, E. A. Communication Networks, Vol 2. New York: John Wiley and Sons, 1935. Saal, R., and E. Ulbrich. “On the Design of Filters by Synthesis.” IRE Transactions on Circuit Theory (December, 1958). Steward, J. L. Circuit Theory and Design. New York: John Wiley and Sons, 1956. Tow, J. “A Step-by-Step Active Filter Design.” IEEE Spectrum 6 (December, 1969): 64–68. Williams, A. B. Active Filter Design. Dedham, Massachusetts: Artech House, 1975. Zverev, A. I. Handbook of Filer Synthesis. New York: John Wiley and Sons, 1967.
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7.1 ALL-PASS TRANSFER FUNCTIONS Up until now, the networks we’ve discussed were used to obtain a desired amplitude versus frequency characteristic. No less important is the all-pass family of filters. This class of networks exhibits a flat frequency response but introduces a prescribed phase shift versus frequency. All-pass filters are frequently called delay equalizers. If a network is to be of an all-pass type, the absolute magnitudes of the numerator and denominator of the transfer function must be related by a fixed constant at all frequencies. This condition will be satisfied if the zeros are the images of the poles. Since poles are restricted to the left-half quadrants of the complex frequency plane to maintain stability, the zeros must occur in the right-half plane as the mirror image of the poles about the jv axis. Figure 7-1 illustrates the all-pass pole-zero representations in the complex frequency plane for first-order and second-order all-pass transfer functions.
First-Order All-Pass Transfer Functions The real pole-zero pair of Figure 7-1a has a separation of 2a0 between the pole and zero and corresponds to the following first-order all-pass transfer function: T(s)
s a0 s a0
(7-1)
To determine the absolute magnitude of T(s), compute
Z T(s) Z
Z s a0 Z Z s a0 Z
2a20 v2 2a20 v2
1
(7-2)
where s jv. For any value of frequency, the numerator and denominator of Equation (7-2) are equal, so the transfer function is clearly all-pass and has an absolute magnitude of unity at all frequencies. The phase shift is given by v b(v) 2 tan1 a (7-3) 0 where b(v) is in radians. 279 Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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FIGURE 7-1 All-pass pole-zero patterns: (a) first-order all-pass transfer function; and (b) second-order all-pass transfer function.
The phase shift versus the ratio v/a0, as defined by Equation (7-3), is plotted in Figure 7-2. The phase angle is 0 at DC and 90 at v a0. The phase shift asymptotically approaches 180 with increasing frequency. The group delay was defined in Section 2.2, under “Effect of Nonuniform Time Delay,” as the derivative of the phase shift which results in Tgd
2a0 db(v) 2 dv a0 v2
(7-4)
If Equation (7-4) is plotted with respect to v for different values of a0, a family of curves is obtained, as shown in Figure 7-3. First-order all-pass sections exhibit maximum delay at DC and decreasing delay with increasing frequency. For small values of a0, the delay becomes large at low frequencies and decreases quite rapidly above this range. The delay at DC is found by setting v equal to zero in Equation (7-4), which results in 2 Tgd(DC) a 0
(7-5)
FIGURE 7-2 The phase shift of a first-order all-pass section.
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FIGURE 7-3 Group delay of first-order all-pass transfer functions.
Second-Order All-Pass Transfer Functions The second-order all-pass transfer function represented by the pole-zero pattern of Figure 7-1b is given by vr s v2r Q T(s) vr s2 s v2r Q s2
(7-6)
where vr and Q are the pole resonant frequency (in radians per second) and the pole Q. These terms may also be computed from the real and imaginary pole-zero coordinates of Figure 7-1b by vr 2a21 b21
(7-7)
vr Q 2a1
(7-8)
and
The absolute magnitude of T(s) is found to be
A v2 v2 B Å r 2
k T(s) k
Å
A
v2r
vB 2 2
v2v2r Q2 v2v2r
1
(7-9)
Q2
which is all-pass.
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The phase shift in radians is vvr Q b(v) 2 tan1 § 2 ¥ vr v2
(7-10)
and the group delay is given by Tgd
2Qvr A v2 v2r B
Q 2 A v2 v2r B v2v2r 2
(7-11)
The phase and delay parameters of first-order transfer functions are relatively simple to manipulate since they are a function of a single design parameter a0. A second-order type, however, has two design parameters, Q and vr. The phase shift of a second-order transfer function is 180 at v vr. At DC, the phase shift is zero and at frequencies well above vr the phase asymptotically approaches 360. The group delay reaches a peak which occurs very close to vr. As the Q is made larger, the peak delay increases, the delay response becomes sharper, and the delay at DC decreases, as shown in Figure 7-4. The frequency of maximum delay is slightly below vr and is expressed in radians per second by v A Tgd,max B vr
ÅÇ
4
1 1 Q2
(7-12)
For all practical purposes, the maximum delay occurs at vr for Qs in excess of 2. By setting v vr in Equation (7-11), the delay at vr is given by 4Q 2Q Tgd,max v pfr r
(7-13)
FIGURE 7-4 Group delay of second-order all-pass transfer functions.
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If we set v 0, the delay at DC is found from Tgd(DC)
2 1 Qvr Qpfr
(7-14)
7.2 DELAY EQUALIZER SECTIONS Passive or active networks that realize first- or second-order all-pass transfer functions are called delay equalizers, since they are normally used to provide a required delay characteristic without disturbing the amplitude response. All-pass networks can be realized in a variety of configurations both passive and active. Equalizers with adjustable characteristics can also be designed, and are discussed in Section 7.6. LC All-Pass Structures First-Order Constant-Resistance Circuit. The lattice of Figure 7-5a realizes a firstorder all-pass transfer function. The network is also a constant-resistance type, which means that the input impedance has a constant value of R over the entire frequency range. Constant-resistance networks can be cascaded with no interaction so that composite delay curves can be built up by accumulating the individual delay contributions. The lattice has an equivalent unbalanced form shown in Figure 7-5b. The design formulas are given by 2R L a 0
(7-15)
2 a0R
(7-16)
C
where R is the desired impedance level and a0 is the real pole-zero coordinate. The phase shift and delay properties were defined by Equations (7-3) through (7-5). The circuit of Figure 7-5b requires a center-tapped inductor having a coefficient of magnetic coupling K equal to unity. Second-Order Constant-Resistance Sections. A second-order all-pass lattice with constant-resistance properties is shown in Figure 7-6a. The circuit may be transformed into the unbalanced bridged-T form of Figure 7-6b. The elements are given by La
2R vrQ
(7-17)
Ca
Q vr R
(7-18)
FIGURE 7-5 First-order LC equalizer section: (a) lattice form; and (b) unbalanced form.
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QR 2vr
(7-19)
2Q vr(Q 2 1)R
(7-20)
Lb Cb
For tuning and test purposes, the section can be split into parallel and series resonant branches by opening the shunt branch and shorting the bridging or series branch, as shown in Figure 7-6c. Both circuits will resonate at vr. The T-to-pi transformation was first introduced in Section 4.1. This transformation may be applied to the T of capacitors that are embedded in the section of Figure 7-6b to reduce capacitor values if desired. The resulting circuit is given in Figure 7-6d. Capacitors C1 and C2 are computed as follows: C1
C 2a 2Ca Cb
(7-21)
FIGURE 7-6 Second-order section Q 1: (a) lattice form; (b) unbalanced form; (c) circuit for measuring branch resonances; (d ) circuit modified by a T-to-pi transformation; and (e) resonant branches of modified circuit.
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C2
CaCb 2Ca Cb
285
(7-22)
The branch resonances are obtained by opening the shunt branch and then shorting the bridging branch, which results in the parallel and series resonant circuits of Figure 7-6e. Both resonances occur at vr. Close examination of Equation (7-20) indicates that Cb will be negative if the Q is less than 1. (If Q 1, Cb can be replaced by a short.) This restricts the circuits of Figure 7-6 to those cases where the Q is in excess of unity. Fortunately, this is true in most instances. In those cases where the Q is below 1, the configurations of Figure 7-7 are used. The circuit of Figure 7-7a uses a single inductor with a controlled coefficient of coupling given by 1 Q2 1 Q2
(7-23)
(Q 2 1)R 2Qvr
(7-24)
C3
Q 2vr R
(7-25)
C4
2 Qvr R
(7-26)
K3 The element values are given by L 3a
It is not always convenient to control the coefficient of coupling of a coil to obtain the specific value required by Equation (7-23). A more practical approach uses the circuit of Figure 7-7b. The inductor L3b is center-tapped and requires a unity coefficient of coupling (typical values of 0.95 or greater can usually be obtained and are acceptable). The values of L3b and L4 are computed from L 3b 2(1 K 3)L 3a L4
(1 K 3)L 3a 2
(7-27) (7-28)
FIGURE 7-7 Second-order section Q 1: (a) circuit with a controlled coefficient of coupling; and (b) circuit with unity coefficient of coupling.
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The sections of Figure 7-7 may be tuned to vr in the same manner as in the equalizers in Figure 7-6. A parallel resonant circuit is obtained by opening C4, and a series resonant circuit will result by placing a short across C3. The second-order section of Figures 7-6 and 7-7 may not always be all-pass. If the inductors have insufficient Q, a notch will occur at the resonances and will have a notch depth that can be approximated by AdB 20 log
Q L 4Q Q L 4Q
(7-29)
where QL is the inductor Q. If the notch is unacceptable, adequate coil Q must be provided or amplitude-equalization techniques are used, as discussed in section 8.4. Minimum Inductor All-Pass Sections. The bridged-T circuit of Figure 7-8 realizes a second-order all-pass transfer function with a single inductor. The section is not a constantresistance type, and operates between a zero impedance source and an infinite load. If the ratio of load to source is well in excess of 10, satisfactory results will be obtained. The elements are computed by
and
C
Q 4vrR
(7-30)
L
1 v2r C
(7-31)
The value of R can be chosen as the geometric mean of the source and load impedance
A 2RSRL B . The LC circuit is parallel resonant at vr.
The reader is reminded that the design parameters Q and vr are determined from the delay parameters defined in Section 7.1, which covers all-pass transfer functions. A notch will occur at resonance due to a finite inductor Q and can be calculated from AdB 20 log
4R vr LQ L 4R vr LQ L
(7-32)
If R is set equal to vr LQL/4, the notch attenuation becomes infinite and the circuit is then identical to the bridged-T null network of section 6.1. Two sets of all pass poles and zeros corresponding to a fourth-order transfer function can also be obtained by using a minimum-inductance-type structure. The circuit configuration is shown in Figure 7-9.
FIGURE 7-8 Minimum inductor type, second-order section.
FIGURE 7-9 A fourth-order minimum inductance, all-pass structure.
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Upon being given two sets of equalizer parameters Q 1, vr1 and Q 2, vr2, as defined in Section 7.1, the following equations are used to determine the element values: First, compute A v21v2r 2 B A¢ C D
1 1 ≤ vr2Q 2 vr1Q 1
Q 1Q 2 A(Q 2vr1 Q 1vr2)
Q 1Q 2 A v2r 1 v2r 2 B vr1vr2 1 C ABQ 1Q 2 AB 2C
(7-33) (7-34) (7-35) (7-36)
1 ABCD
(7-37)
L1
4ER A
(7-38)
C1
AD 4R
(7-39)
L2
4BR A
(7-40)
C2
AC 4R
(7-41)
E The element values are then given by
The value of R is generally chosen as the geometric mean of the source and load terminations, as with the second-order minimum-inductance section. The series and parallel branch resonant frequencies are found from vL1C1 and
vL2C2
1 2ED 1 2BC
(7-42) (7-43)
Active All-Pass Structures. First- and second-order all-pass transfer functions can be obtained by using an active approach. The general form of the active all-pass section is represented by the block diagram of Figure 7-10, where T(s) is a first- or second-order transfer function having a gain of unity. First-Order Sections. The transfer function of the circuit of Figure 7-10 is given by E out 2T(s) 1 E in
(7-44)
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FIGURE 7-10 The general form of an active all-pass section.
If T(s) is a first-order RC high-pass network having the transfer function sCR/(sCR 1), the composite transfer function becomes E out s 1/RC E in s 1/RC
(7-45)
This expression corresponds to the first-order all-pass transfer function of Equation (7-1), where a0
1 RC
(7-46)
The circuit can be directly implemented by the configuration of Figure 7-11a, where Rr is arbitrary. The phase shift is then given by b(v) 2 tan 1vRC
(7-47)
and the delay is found from Tgd
2RC (vRC)2 1
(7-48)
At DC, the delay is a maximum and is computed from Tgd(DC) 2RC
(7-49)
The corresponding phase shift is shown in Figure 7-2. A phase shift of 90 occurs at v 1/RC and approaches 180 and 0 at DC and infinity, respectively. By making the element R variable, an all-pass network can be obtained having a phase shift adjustable between 0 and 180. A sign inversion of the phase will occur if the circuit of Figure 7-11b is used. The circuit will remain all-pass and first-order, and the group delay is still defined by Equations (7-48) and (7-49).
FIGURE 7-11 First-order all-pass sections: (a) circuit with lagging phase shift; and (b) circuit with leading phase shift.
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Second-Order Section. If T(s) in Figure 7-10 is a second-order bandpass network having the general bandpass transfer function vr s Q T(s) vr s2 s v2r Q
(7-50)
the composite transfer function then becomes vr s2 s v2r E out Q 2T(s) 1 vr E in s2 s v2r Q
(7-51)
which corresponds to the second-order all-pass expression given by Equation (7-6) (except for a simple sign inversion). Therefore, a second-order all-pass equalizer can be obtained by implementing the structure of Figure 7-10 using a single active band-pass section for T(s). Section 5-2 discussed the MFBP, DABP, and biquad all-pole bandpass sections. Each circuit can be combined with a summing amplifier to generate a delay equalizer. The MFBP equalizer is shown in Figure 7-12a. The element values are given by R2
2Q Q vrC pfrC
(7-52)
R2 2
(7-53)
R1a R1b
R1a 2Q 2 1
(7-54)
The values of C and R can be arbitrarily chosen, and A in Figure 7-12a corresponds to the desired gain. The maximum delay which occurs at fr was given by Equation (7-13). This expression can be combined with Equations (7-52) and (7-54), so the element values can alternately by expressed in terms of Tgd, max as follows for Q 2: R2 R1b
Tgd,max
(7-55)
2C R2
A pfrTgd,max B 2 2
(7-56)
where R1a remains R2/2. The MFBP section can be tuned by making R1b variable. R1b can then be adjusted until 180 of phase shift occurs between the input and output of the bandpass section at fr. In order for the response to be all-pass, the bandpass section gain must be exactly unity at resonance. Otherwise, an amplitude ripple will occur in the frequency-response characteristic in the vicinity of fr.
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FIGURE 7-12 The MFBP delay equalizer Q 20: (a) circuit for 0.707 Q 20; and (b) circuit for Q 0.707.
The section Q is limited to values below 20, or is expressed in terms of delay, as in the following: Tgd,max
40 pfr
(7-57)
Experience has indicated that required Qs are usually well under 20, so this circuit will suffice in most cases. However, if the Q is below 0.707, the value of R1b, as given by Equation (7-54), is negative, so the circuit of Figure 7-12b is used. The value of R1 is given by R2 (7-58) R1 4Q 2 In the event that higher Qs are required, the DABP section can be applied to the block diagram of Figure 7-10. Since the DABP circuit has a gain of 2 and is noninverting, the implementation shown in Figure 7-13 is used. The element values are given by R1 and
Q Q vrC 2pfrC
R2 R3
R1 Q
(7-59) (7-60)
where C, R, and Rr can be conveniently chosen. Resistor R2 may be made variable if tuning is desired. The Q, and therefore the delay, can also be trimmed by making R1 adjustable. Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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FIGURE 7-13
291
The DABP delay equalizer Q 150.
The biquad structure can be configured in the form of a delay equalizer. The circuit is shown in Figure 7-14, and the element values are computed from R1 R4
Q Q vrC 2pfrC
(7-61)
R1 Q
(7-62)
R2 R3
and where C, R, and Rr are arbitrary.
FIGURE 7-14
The biquad delay equalizer Q 200.
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Resistor R3 can be made variable for tuning. The Q is adjusted for the nominal value by making R1 variable and monitoring the 3-dB bandwidth at the output of the bandpass section, or by adjusting for unity bandpass gain at fr. The biquad is subject to the Q-enhancement effect discussed in Section 5.2, under “All-Pole Bandpass Configurations,” so a Q adjustment is usually required.
7.3 DESIGN OF DELAY LINES The classical approach to the design of delay lines involves a cascade of identical LC sections (except for the end sections) and uses image-parameter theory (see Wallis in Bibliography). This technique is an approximation at best. Modern network theory permits us to predict the delay of networks accurately and to obtain a required delay in a much more efficient manner than with the classical approach. The Bessel, linear phase with equiripple error and transitional filters all feature a constant delay. The curves in Chapter 2 indicate that for n 3, the flat delay region is extended well into the stopband. If a delay line is desired, a low-pass filter implementation is not a very desirable approach from a delay-bandwidth perspective. A significant portion of the constant delay region would be attenuated. All the low-pass transfer functions covered can be implemented by using an all-pass realization to overcome the bandwidth limitations. This results in a precise and efficient means of designing delay lines. The Low-Pass to All-Pass Transformation A low-pass transfer function can be transformed to an all-pass transfer function simply by introducing zeros in the right-half plane of the jv axis corresponding to each pole. If the real and complex poles tabulated in Chapter 11 are realized using the first- and secondorder all-pass structures of Section 7.2, complementary zeros will also occur. When a lowpass to all-pass transformation is made, the low-pass delay is increased by a factor of exactly 2 because of the additional phase-shift contributions of the zeros. An all-pass delay-bandwidth factor can be derived from the delay curves of Chapter 2, which is given by TU vuTgd(DC)
(7-63)
The value of Tgd (DC) is the delay at DC, which is twice the delay shown in the curves because of the all-pass transformation, and vu is the upper limit radian frequency where the delay deviates a specified amount from the DC value. Table 7-1 lists the delay at DC, vu, and the delay-bandwidth product TU for an all-pass realization of the Bessel maximally flat delay family. Values are provided for both 1- and 10-percent deviations of delay at vu. To choose a transfer-function type and determine the complexity required, first compute TUreq 2pfgdTgd
(7-64)
where fgd is the maximum desired frequency of operation and Tgd is the nominal delay needed. A network is then selected that has a delay-bandwidth factor TU which exceeds TUreq. Compute the delay-scaling factor (DSF), which is the ratio of the normalized delay at DC to the required nominal delay. For example: DSF
Tgd(DC) Tgd
(7-65)
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TABLE 7-1 All-Pass Bessel Delay Characteristics 1-Percent Deviation
10-Percent Deviation
N
Tgd (DC)
vu
TU
vu
TU
2 3 4 5 6 7 8 9
2.72 3.50 4.26 4.84 5.40 5.90 6.34 6.78
0.412 0.691 0.906 1.120 1.304 1.478 1.647 1.794
1.121 2.419 3.860 5.421 7.042 8.720 10.440 12.160
0.801 1.109 1.333 1.554 1.737 1.912 2.079 2.227
2.179 3.882 5.679 7.521 9.380 11.280 13.180 15.100
The corresponding poles of the filter selected are denormalized by the DSF and can then be realized by the all-pass circuits of Section 7.2. A real pole a0 is denormalized by the formula ar0 a0 DSF
(7-66)
Complex poles tabulated in the form a jb are denormalized and transformed into the all-pass section design parameters vr and Q by the relationships vr DSF 2a2 b2 Q
vr 2aDSF
(7-67) (7-68)
The parameters ar0, vr , and Q are then directly used in the design equations for the circuits of Section 7.2. Sometimes the required delay-bandwidth factor TUreq, as computed by Equation (7-64), is in excess of the TU factors available from the standard filter families tabulated. The total delay required can then be subdivided into N smaller increments, and realized by N delay lines in cascade, since the delays will add algebraically. LC Delay Lines. LC delay lines are designed by first selecting a normalized filter type and then denormalizing the corresponding real and complex poles, all in accordance with Section 7.3, under “The Low-Pass to All-Pass Transformation.” The resulting poles and associated zeros are then realized using the LC all-pass circuit of Section 7.2. This procedure is best illustrated by the following design example. Example 7-1
Design of a 1mS LC Delay Line
Required:
Design a passive delay line to provide 1 ms of delay constant within 10 percent from DC to 3200 Hz. The source and load impedances are both 10 k. Result:
(a) Compute the required delay-bandwidth factor. TUreq 2pfgdTgd 2p3200 0.001 20.1
(7-64)
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A linear phase design with an equiripple error of 0.5 will be chosen. The delay characteristics for the corresponding low-pass filters are shown in Figure 2-64. The delay at DC of a normalized all-pass network for n 9 is equal to 7.5 s, which is twice the value obtained from the curves. Since the delay remains relatively flat to 3 rad/s, the delay-bandwidth factor is given by TU vuTgd(DC) 3 7.5 22.5
(7-63)
Since TU is in excess of TUreq, the n 9 design will be satisfactory. (b) The low-pass poles are found in Table 11-45 and are as follows: 0.5688 j0.7595 0.5545 j1.5089 0.5179 j2.2329 0.4080 j2.9028 0.5728 Four second-order all-pass sections and a single first-order section will be required. The delay-scaling factor is given by DSF
Tgd(DC) Tgd
7.5 7500 103
(7-65)
The denormalized design parameters vr and Q for the second-order sections are computed by Equations (7-67) and (7-68), respectively, and are tabulated as follows:
Section
a
b
vr
Q
1 2 3 4
0.5688 0.5545 0.5179 0.4080
0.7595 1.5089 2.2329 2.9028
7117 12057 17191 21985
0.8341 1.450 2.213 3.592
The design parameter ar0 for section 5 corresponding to the real pole is found from ar0 a0 DSF 4296
(7-66)
where a0 is 0.5728. (c) The element values can now be computed as follows: Section 1:
Since the Q is less than unity, the circuit of Figure 7-7b will be used. The element values are found from K3
1 Q2 1 0.83412 0.1794 1 Q2 1 0.83412
(7-23)
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L 3a
(Q 2 1)R (0.83412 1)104 1.428 H 2Qvr 2 0.8341 7117
(7-24)
Q 0.8341 5860 pF 2vr R 2 7117 104
(7-25)
2 2 0.0337 F Qvr R 0.8341 7117 104
(7-26)
C3 C4
295
L 3b 2(1 K 3)L 3a 3.368 H
(7-27)
(1 K 3)L 3a L4 0.586 H 2
(7-28)
Sections 2 through 4:
Since the Qs are in excess of unity, the circuit of Figure 7-6b will be used. The values for section 2 are found from La
2 104 2R 1.144 H vrQ 12,057 1.450
(7-17)
Ca
Q 1.450 0.012 F vrR 12,057 104
(7-18)
QR 1.450 104 0.601 H 2vr 2 12,057
(7-19)
2Q 2 1.450 0.0218 F vr(Q 2 1)R 12,057(1.452 1)104
(7-20)
Lb Cb
In the same manner, the remaining element values can be computed, which results in Section 3:
La 0.526 H Ca 0.0129 F Lb 0.644 H Cb 6606 pF Section 4:
La 0.253 H Ca 0.0163 F Lb 0.817 H Cb 2745 pF Section 5:
The remaining first-order all-pass section is realized using the circuit of Figure 7-5b. The element values are given by L
2 104 2R 4.655 H ar0 4296
(7-15)
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FIGURE 7-15
The 1-ms delay line of Example 7-1: (a) delay-line circuit; and (b) frequency response.
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C
2 2 0.0466 F ar0R 4296 104
297
(7-16)
(d) The resulting delay line is illustrated in Figure 7-15a. The resonant frequencies shown are in hertz, and correspond to vr /2p for each section. The center-tapped inductors require a unity coefficient of coupling. The delay characteristics as a function of frequency are also shown in Figure 7-15b. The delay line of Example 7-1 requires a total of nine inductors. If the classical design approach (see Wallis in Bibliography), which is based on image-parameter theory, were used, the resulting delay line would use about twice as many coils. Although the inductors would all be uniform in value (except for the end sections), this feature is certainly not justified by the added cost and complexity. Active Delay Lines. An active delay line is designed by initially choosing a normalized filter and then denormalizing the associated poles in the same manner as in the case of LC delay lines. The resulting all-pass design parameters are implemented using the first- and second-order active structures of Section 7.2. Active delay lines do not suffer from the Q limitations of LC delay lines and are especially suited for low-frequency applications where inductor values may become impractical. The following example illustrates the design of an active delay line.
Example 7-2
Design of a 100 S Active Delay Line
Required:
Design an active delay line having a delay of 100 s constant within 3 percent to 3 kHz. A gain of 10 is also required. Result:
(a) Compute the required delay-bandwidth factor. TUreq 2pfgdTgd 2p3000 104 1.885
(7-64)
A Bessel-type all-pass network will be chosen. Table 7-1 indicates that for a delay deviation of 1 percent, a complexity of n 3 has a delay-bandwidth factor of 2.419, which is in excess of the required value. (b) The Bessel low-pass poles are given in Table 12-41 and the corresponding values for n 3 are 1.0509 j1.0025 1.3270 Two sections are required consisting of a first-order and second-order type. The delay-scaling factor is computed to be DSF
Tgd(DC) Tgd
3.5 3.5 104 104
(7-65)
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where Tgd(DC) is obtained from Table 7-1 and Tgd is 100 s, the design value. The second-order section design parameters are vr DSF 2a2 b2 3.5 104 21.05092 1.00252 50,833 and
Q
vr 50,833 6.691 2aDSF 2 1.509 3.5 104
(7-67) (7-68)
The first-order section design parameter is given by a r0 a0 DSF 1.327 3.5 104 46,450
(7-66)
(c) The element values are computed as follows: The second-order section:
The MFBP equalizer section of Figure 7-12b will be used corresponding to Q 0.707, where R 10 k, C 0.01 F, and A 10. The element values are found from R2 R1
2Q 2 0.691 2719 vrC 50,833 108 R2 4Q 2
2719 1424 4 0.6912
(7-52) (7-58)
The first-order section:
The first-order section of Figure 7-11a will be used, where Rr is chosen at 10 k, C at 0.01 F, and ar0 is 46,450. The value of R is given by R
1 1 2153 ar0C 46,450 108
(7-46)
(d) The resulting 100-s active delay line is shown in Figure 7-16 using standard 1-percent resistor values.
FIGURE 7-16
The 100-s delay line of Example 7-2.
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7.4 DELAY EQUALIZATION OF FILTERS The primary emphasis in previous chapters has been the attenuation characteristics of filters. However, if the signal consists of a modulated waveform, the delay characteristics are also of importance. To minimize distortion of the input signal, a constant delay over the frequency range of interest is desirable. Typically, this would be 6 dB or so. The greater the attenuation, the less significant the impact of delay variation (delay distortion) since the spectral contributions of the attenuated signals are reduced. The Bessel, linear phase with equiripple error, and transitional filter families all exhibit a flat delay. However, the amplitude response is less selective than that of other families. Frequently, the only solution to an attenuation requirement is a Butterworth, Chebyshev, or ellipticfunction filter type. To also maintain the delay constant, delay equalizers would be required. It is important to recognize that there are trade-offs between steep attenuation requirements and flatness of delay. For example, the higher the ripple of a Chebyshev filter, the steeper the rate of attenuation, but also the larger the delay deviation from flatness, especially around the corner frequency. Delay distortion also grows larger with increasing order n and steepness of elliptic function filters, as well as ripple. Steep elliptic function filters and high-order Chebyshev filters (see Section 2.4) are especially difficult to equalize since their delay characteristics near cutoff exhibit sharp delay peaks (horn-like in appearance). Delay equalizer networks are frequently at least as complex as the filter being equalized. The number of sections required is dependent on the initial delay curve, the portion of the curve to be equalized, and the degree of equalization necessary. A very crude approximation to the number of equalizer sections required is given by n 2 BW T 1
(7-69)
where BW is the bandwidth of interest in hertz, and T is the delay distortion over BW in seconds. The approach to delay equalization discussed in this section is graphical rather than analytical. A closed-form solution to the delay equalization of filters is not available. However, computer programs can be obtained that achieve a least-squares approximation to the required delay specifications, and are preferred to trial-and-error techniques. (See Note 1.) Simply stated, delay equalization of a filter involves designing a network that has a delay shape which complements the delay curve of the filter being equalized. The composite delay will then exhibit the required flatness. Although the absolute delay increases as well, this result is usually of little significance, since it is the delay variation over the band of interest that disperses the spectral components of the signal. Typical delay curves of a bandpass filter, the delay equalizer network, and the composite characteristics are shown in Figure 7-17. To equalize the delay of a low-pass filter graphically, the highest frequency of interest and corresponding delay should be scaled to 1 rad/s so that the lower portion of the curve falls within the frequency region between DC and v 1. This is accomplished by multiplying the delay axis by 2pfh, where fh is the highest frequency to be equalized. The frequency axis is also divided by fh and interpreted in radians per second so that fh is transformed to 1 rad/s and all other frequencies are normalized to this point. Note 1: The full version of Filter Solutions available from Nuhertz Technologies® (www.nuhrtz.com), uses a proprietary approach to automatically perform equalization of low-pass and bandpass filters. The final results can then be manually “tweaked” by adjusting the pole-zero locations while observing the changes in group delay in real time. The normalized low-pass filter delay curves shown in section 2 for the various filter families may also be used directly. In either case, the required equalizer delay characteristic is
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FIGURE 7-17
The delay equalization of a bandpass filter.
obtained by subtracting the delay curve from a constant equal to the maximum delay that occurs over the band. The resulting curve is then approximated by adding the delay contributions of equalizer sections. A sufficient number of sections is used to obtain the required composite delay flatness. When a suitable match to the required curve is found, the equalizer parameters may be directly used to design the equalizer, and the circuit is then denormalized to the required frequency range and impedance level. Alternatively, the equalizer parameters can first be denormalized and the equalizer designed directly. Bandpass filters are equalized in a manner similar to low-pass filters. The delay curve is first normalized by multiplying the delay axis by 2pf0, where f0 is the filter center frequency. The frequency axis is divided by f0 and interpreted in radians per second so that the center frequency is 1 rad/s and all other frequencies are normalized to the center frequency. A complementary curve is found, and appropriate equalizer sections are used until a suitable fit occurs. The equalizer is then denormalized. First-Order Equalizers. First-order all-pass transfer functions were first introduced in Section 7.1. The delay of a first-order all-pass section is characterized by a maximum delay at low frequencies, and decreasing delay with increasing frequency. As the value of a0 is reduced, the delay tends to peak at DC and will roll off more rapidly with increasing frequencies. The delay of a first-order all-pass section was given in Section 7.1 by Tgd
2a0 a 20 v2
(7-4)
Working directly with Equation (7-4) is somewhat tedious, so a table of delay values for a0 ranging between 0.05 and 2.00 at frequencies from v 0 to v 1 is provided in Table 7-2. This table can be directly used to determine the approximate a0 necessary to equalize the normalized filter delay. A more exact value of a0 can then be determined from Equation (7-4) if desired. Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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TABLE 7-2 The First-Order Equalizer Delay in Seconds v, rad/s a0
0
0.1
0.2
0.3
0.4
0.5
0.6
0.7
0.8
0.9
1.0
0.05 0.10 0.15 0.20 0.25
40.00 20.00 13.33 10.00 8.00
8.00 10.00 9.23 8.00 6.90
2.35 4.00 4.80 5.00 4.88
1.08 2.00 2.67 3.08 3.28
0.62 1.18 1.64 2.00 2.25
0.40 0.77 1.10 1.38 1.60
0.28 0.54 0.78 1.00 1.18
0.20 0.40 0.59 0.75 0.91
0.16 0.31 0.45 0.59 0.71
0.12 0.24 0.36 0.47 0.57
0.10 0.20 0.29 0.38 0.47
0.30 0.35 0.40 0.45 0.50
6.67 5.71 5.00 4.44 4.00
6.00 5.28 4.71 4.24 3.85
4.62 4.31 4.00 3.71 3.45
3.33 3.29 3.20 3.08 2.94
2.40 2.48 2.50 2.48 2.44
1.76 1.88 1.95 1.99 2.00
1.33 1.45 1.54 1.60 1.64
1.03 1.14 1.23 1.30 1.35
0.82 0.92 1.00 1.07 1.12
0.67 0.75 0.82 0.89 0.94
0.55 0.62 0.69 0.75 0.80
0.55 0.60 0.65 0.70 0.75
3.64 3.33 3.08 2.86 2.67
3.52 3.24 3.01 2.80 2.62
3.21 3.00 2.81 2.64 2.49
2.80 2.67 2.54 2.41 2.30
2.38 2.31 2.23 2.15 2.08
1.99 1.97 1.93 1.89 1.85
1.66 1.67 1.66 1.65 1.63
1.39 1.41 1.42 1.43 1.43
1.17 1.20 1.22 1.24 1.25
0.99 1.03 1.05 1.08 1.09
0.84 0.88 0.91 0.94 0.96
0.80 0.85 0.90 0.95 1.00
2.50 2.35 2.22 2.11 2.00
2.46 2.32 2.20 2.08 1.98
2.35 2.23 2.12 2.02 1.92
2.19 2.09 2.00 1.91 1.83
2.00 1.93 1.86 1.79 1.72
1.80 1.75 1.70 1.65 1.60
1.60 1.57 1.54 1.50 1.47
1.42 1.40 1.38 1.36 1.34
1.25 1.25 1.24 1.23 1.22
1.10 1.11 1.11 1.11 1.10
0.98 0.99 0.99 1.00 1.00
1.25 1.50 1.75 2.00
1.60 1.33 1.14 1.00
1.59 1.33 1.14 1.00
1.56 1.31 1.13 0.99
1.51 1.28 1.11 0.98
1.45 1.24 1.09 0.97
1.38 1.20 1.06 0.94
1.30 1.15 1.02 0.92
1.22 1.09 0.99 0.89
1.14 1.04 0.95 0.86
1.05 0.98 0.90 0.83
0.98 0.92 0.86 0.80
Use of Table 7-2 is best illustrated by an example, as follows. Example 7-3
Design of an LC and Active Delay Equalizer for a Low-Pass Filter
Required:
Design a delay equalizer for an n 5 Butterworth low-pass filter having a 3-dB cutoff of 1600 Hz. The delay variation should not exceed 75 s from DC to 1600 Hz. Result:
(a) The Butterworth normalized delay curves of Figure 2-35 can be used directly since the region between DC and 1 rad/s corresponds to the frequency range of interest. The curve for n 5 indicates that the peak delay occurs near 0.9 rad/s and is approximately 1.9 s greater than the value at DC. This corresponds to a denormalized variation of 1.9/2pfh, or 190 s, where fh is 1600 Hz, so an equalizer is required. (b) Examination of Table 7-2 indicates that a first-order equalizer with an a0 of 0.7 has a delay at DC that is approximately 1.8 s greater than the delay at 0.9 rad/s, so a reasonable fit to the required shape should occur. Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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FIGURE 7-18 The delay equalization of Example 7-3: (a) filter and equalizer delay curves; (b) composite delay curve; (c) LC equalizer; and (d) active equalizer.
The delay of the normalized filter and the first-order equalizer for a0 0.7 is shown in Figure 7.18a. The combined delay is given in Figure 7-18b. The peak-to-peak delay variation is about 0.7 s, which corresponds to a denormalized delay variation of 0.7/2pfh or 70 s. (c) The first-order equalizer parameter a0 0.7 is denormalized by the factor 2pfh, resulting in ar0 7037. The corresponding passive equalizer is designed as follows, where the impedance level R is chosen to be 1 k: L
2 103 2R 0.284 H 7037 ar0
(7-15)
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C
2 2 0.284 F ar0R 7037 103
303
(7-16)
The first-order LC equalizer section is shown in Figure 7-18c. (d) An active first-order equalizer section can also be designed using the circuit of Figure 7-11a. If we select a C of 0.1 F, where Rr 10 k, the value of R is given by R
1 1 1421 ar0C 7037 107
(7-46)
The active equalizer circuit is illustrated in Figure 7-18d. Highly selective low-pass filters such as the elliptic-function type have a corresponding delay characteristic that increases very dramatically near cutoff. First-order all-pass sections cannot then provide a complementary delay shape, so they are limited to applications involving low-pass filters of moderate selectivity. Second-Order Equalizers. First-order equalizers have a maximum delay at DC and a single design parameter a0 which limits their use. Second-order sections have two design parameters, vr and Q. The delay shape is bandpass in nature and can be made broad or sharp by changing the Q. The peak delay frequency is determined by the design parameter vr. As a result of this flexibility, second-order sections can be used to equalize virtually any type of delay curve. The only limitation is in the number of sections the designer is willing to use, and the effort required to achieve a given degree of equalization. The group delay of a second-order all-pass section was given by Tgd
2Qvr A v2 v2r B
Q 2 A v2 v2r B v2v2r 2
(7-11)
If we normalize this expression by setting vr equal to 1, we obtain Tgd
2Q(v2 1) Q (v2 1)2 v2 2
(7-70)
To determine the delay at DC, we can set equal to zero, which results in Tgd(DC)
2 Q
(7-71)
For Qs below 0.577, the maximum delay occurs at DC. As the Q is increased, the frequency where maximum delay occurs approaches 1 rad/s and is given by v A Tgd,max B
ÅÇ
4
1 1 Q2
(7-72)
For Qs of 2 or more, the maximum delay can be assumed to occur at 1 rad/s and may be determined from Tgd,max 4Q
(7-73)
Equations (7-70) through (7-72) are evaluated in Table 7-6 for Qs ranging from 0.25 to 10. To use Table 7-6 directly, first normalize the curve to be equalized so that the minimum delay occurs at 1 rad/s. Then, select an equalizer from the table that provides the best fit for a complementary curve.
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A composite curve is then plotted. If the delay ripple is excessive, additional equalizer sections are required to fill in the delay gaps. The data of Table 7-6 can again be used by scaling the region to be equalized to a 1-rad/s center and selecting a complementary equalizer shape from the table. The equalizer parameters can then be shifted to the region of interest by scaling. The procedure described is an oversimplification of the design process. The equalizer responses will interact with each other, so each delay region to be filled in cannot be treated independently. Every time a section is added, the previous sections may require an adjustment of their design parameters. Delay equalization generally requires considerably more skill than the actual design of filters. Standard pole-zero patterns are defined for the different filter families, whereas the design of equalizers involves the approximation problem where a pole-zero pattern must be determined for a suitable fit to a curve. The following example illustrates the use of second-order equalizer sections to equalize delay.
Example 7-4 Design of a Delay Equalizer for a Band-Pass Filter Required:
A bandpass filter with the delay measurements of Table 7-3 must be equalized to within 700 s. The corresponding delay curve is plotted in Figure 7-19a. Result:
(a) Since the minimum delay occurs at 1000 Hz, normalize the curve by dividing the frequency axis by 1000 Hz and multiplying the delay axis by 2p 1000. The results are shown in Table 7-4 and plotted in Figure 7-19b. (b) An equalizer is required that has a nominal delay peak of 10 s at 1 rad/s relative to the delay at 0.5 and 1.5 rad/s. Examination of Table 7-6 indicates that the delay corresponding to a Q of 2.75 will meet this requirement. If we add this delay, point by point, to the normalized delay of Table 7-4, the values of Table 7-5 will be obtained.
TABLE 7-3 Specified Delay
TABLE 7-4 Normalized Delay
Frequency, Hz
Delay, s
Frequency, rad/s
Delay, s
500 600 700 800 900 1000 1100 1200 1300 1400 1500
1600 960 640 320 50 0 160 480 800 1120 1500
0.5 0.6 0.7 0.8 0.9 1.0 1.1 1.2 1.3 1.4 1.5
10.1 6.03 4.02 2.01 0.31 0 1.01 3.02 5.03 7.04 9.42
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TABLE 7-5 Equalized Delay Frequency, rad/s
Delay, s
0.5 0.6 0.7 0.8 0.9 1.0 1.1 1.2 1.3 1.4 1.5
11.6 8.19 7.36 7.58 9.50 11.0 8.89 7.64 7.83 8.86 10.7
FIGURE 7-19 The delay equalization of Example 7-4: (a) unequalized delay; (b) normalized delay; (c) normalized equalized delay; and (d) denormalized equalized delay.
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0.50 0.47 0.44 0.42 0.40
0.33 0.29 0.25 0.22 0.20
4.00 4.25 4.50 4.75 5.00
6.00 7.00 8.00 9.00 10.00
0.997 0.997 0.998 0.999 0.999
0.992 0.993 0.994 0.994 0.995
0.983 0.986 0.988 0.990 0.991
0.941 0.957 0.968 0.975 0.980
24.0 28.0 32.0 36.0 40.0
16.1 17.1 18.1 19.1 20.1
11.1 12.1 13.1 14.1 15.1
6.18 7.15 8.13 9.12 10.1
8.00 4.00 3.51 4.31 5.23
0.34 0.29 0.26 0.23 0.21
0.51 0.48 0.46 0.43 0.41
0.75 0.69 0.63 0.59 0.55
1.37 1.17 1.03 0.91 0.82
7.09 3.96 2.70 2.04 1.64
0.38 0.32 0.28 0.25 0.23
0.56 0.53 0.50 0.47 0.45
0.82 0.75 0.69 0.64 0.60
1.47 1.27 1.12 0.99 0.90
5.33 3.85 2.79 2.16 1.76
0.44 0.38 0.33 0.29 0.26
0.65 0.62 0.58 0.55 0.52
0.94 0.87 0.80 0.75 0.70
1.67 1.45 1.28 1.15 1.04
3.85 3.67 2.94 2.37 1.97
0.3
0.54 0.47 0.41 0.36 0.33
0.81 0.76 0.72 0.69 0.65
1.16 1.07 0.99 0.92 0.86
1.99 1.75 1.56 1.40 1.27
2.84 3.45 3.12 2.68 2.30
0.4
0.73 0.63 0.55 0.49 0.44
1.08 1.02 0.97 0.92 0.87
1.53 1.41 1.31 1.23 1.15
2.47 2.22 2.00 1.82 1.66
2.19 3.20 3.31 3.08 2.77
0.5
1.08 0.93 0.82 0.73 0.66
1.57 1.49 1.41 1.35 1.28
2.16 2.02 1.89 1.77 1.67
3.18 2.95 2.72 2.52 2.33
1.76 2.94 3.46 3.53 3.40
0.6
1.82 1.58 1.39 1.24 1.13
2.56 2.44 2.33 2.22 2.13
3.34 3.16 2.99 2.84 2.69
4.16 4.05 3.89 3.71 3.52
1.42 2.69 3.51 3.97 4.16
0.7
10.4 10.5 10.6 10.6 10.6
3.71 10.3 3.28 9.83 2.94 9.28 2.65 8.73 2.41 8.19
4.84 4.68 4.52 4.37 4.23
1.00 2.00 3.00 4.00 5.00
1.0
24.0 28.0 32.0 36.0 40.0
16.0 17.0 18.0 19.0 20.0
11.0 12.0 13.0 14.0 15.0
6.09 6.00 6.88 7.00 7.59 8.00 8.20 9.00 8.74 10.00
1.11 2.21 3.27 4.28 5.22
0.9
5.57 9.19 5.45 9.57 5.31 9.88 5.15 10.1 5.00 10.3
5.28 5.54 5.66 5.69 5.66
1.27 2.44 3.45 4.26 4.87
0.8
9.48 9.18 8.77 8.32 7.87
9.23 9.36 9.46 9.52 9.56
7.88 8.25 8.57 8.84 9.06
5.06 5.75 6.38 6.94 7.44
0.91 1.81 2.69 3.52 4.32
1.1
3.48 3.13 2.82 2.57 2.35
4.30 4.20 4.10 3.99 3.89
4.62 4.60 4.55 4.48 4.40
3.90 4.20 4.41 4.54 4.60
0.84 1.64 2.36 2.99 3.50
1.2
1.71 1.51 1.34 1.20 1.09
2.31 2.22 2.14 2.06 1.98
2.80 2.70 2.60 2.50 2.41
2.92 2.99 2.99 2.95 2.88
0.78 1.49 2.06 2.48 2.76
1.3
1.01 0.88 0.78 0.70 0.69
1.42 1.35 1.29 1.24 1.18
1.82 1.73 1.65 1.56 1.49
2.20 2.17 1.10 2.01 1.92
0.73 1.35 1.79 2.05 2.18
1.4
0.67 0.58 0.51 0.45 0.41
0.95 0.91 0.86 0.82 0.79
1.27 1.20 1.13 1.06 1.01
1.69 1.62 1.53 1.44 1.35
0.69 1.23 1.56 1.71 1.73
1.5
0.47 0.41 0.36 0.32 0.30
0.69 0.65 0.62 0.59 0.56
0.93 0.87 0.82 0.77 0.73
1.33 1.24 1.16 1.08 1.00
0.66 1.12 1.36 1.43 1.40
1.6
0.36 0.31 0.27 0.24 0.22
0.52 0.49 0.47 0.44 0.42
0.72 0.67 0.62 0.58 0.55
1.07 0.98 0.91 0.83 0.77
0.62 1.03 1.19 1.20 1.15
1.7
0.28 0.24 0.21 0.19 0.17
0.41 0.38 0.36 0.35 0.33
0.57 0.53 0.49 0.46 0.43
0.88 0.80 0.73 0.66 0.61
0.60 0.94 1.05 1.03 0.96
1.8
0.22 0.19 0.17 0.15 0.13
0.33 0.31 0.29 0.29 0.27
0.46 0.43 0.40 0.37 0.35
0.73 0.66 0.60 0.54 0.50
0.57 0.87 0.93 0.88 0.81
1.9
0.18 0.16 0.14 0.12 0.11
0.27 0.26 0.24 0.23 0.22
0.38 0.35 0.33 0.31 0.29
0.62 0.55 0.50 0.45 0.41
0.55 0.80 0.83 0.77 0.69
2.0
0.05 0.04 0.04 0.03 0.03
0.08 0.07 0.07 0.07 0.06
0.11 0.10 0.09 0.09 0.08
0.20 0.17 0.15 0.14 0.12
0.38 0.40 0.33 0.27 0.23
3.0
0.03 0.02 0.02 0.02 0.02
0.04 0.04 0.03 0.03 0.03
0.05 0.05 0.05 0.04 0.04
0.10 0.08 0.07 0.06 0.06
0.28 0.24 0.18 0.14 0.11
4.0
0.02 0.01 0.01 0.01 0.01
0.02 0.02 0.02 0.02 0.02
0.03 0.03 0.03 0.03 0.02
0.06 0.05 0.04 0.04 0.04
0.21 0.15 0.11 0.09 0.07
5.0
14:30
0.73 0.67 0.61 0.57 0.53
1.33 1.14 1.00 0.89 0.80
1.50 1.75 2.00 2.25 2.50
DC DC 0.700 0.856 0.913
0.2
06/07/06
2.75 3.00 3.25 3.50 3.75
8.00 4.00 2.67 2.00 1.60
Tgd(DC) v(Tgd,max) Tgd,max 0.1
0.25 0.50 0.75 1.00 1.25
Q
TABLE 7-6 The Delay of Normalized Second-Order Section (vr 1 rad/s)
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The corresponding curve is plotted in Figure 7-19c. This curve can be denormalized by dividing the delay by 2p 1000 and multiplying the frequency axis by 1000, resulting in the final curve of Figure 7-19d. The differential delay variation over the band is about 675 s. The equalizer of Example 7-4 provides over a 2:1 reduction in the differential delay. Further equalization can be obtained with two addition equalizers to fill in the concave regions around 750 and 1250 Hz.
7.5 WIDEBAND 90 8 PHASE-SHIFT NETWORKS Wideband 90 phase-shift networks have a single input and two output ports. Both outputs maintain a constant phase difference of 90 within a prescribed error over a wide range of frequencies. The overall transfer function is all-pass. These networks are widely used in the design of single-sideband systems and in other applications requiring 90 phase splitting. Bedrosian (see the Bibliography) solved the approximation problem for this family of networks on a computer. The general structure is shown in Figure 7-20a and consists of N and P networks. Each network provides real-axis pole-zero pairs and is all-pass. The transfer function is of the form T(s)
(s a1)(s a2) c(s an>2) (s a1)(s a2) c(s an>2)
(7-74)
where n/2 is the order of the numerator and denominator polynomials. The total complexity of both networks is then n. Real-axis all-pass transfer functions can be realized using a cascade of passive or active first-order sections. Both versions are shown in Figure 7-20b and c. The transfer functions tabulated in Table 7-7 approximate a 90 phase difference in an equiripple manner. This approximation occurs within the bandwidth limits vL and vu, as shown in Figure 7-21. These frequencies are normalized so that 2vLvu 1. For a specified bandwidth ratio vu/vL, the individual band limits can be found from
and
vL
vL
Ç vu
vu
Ç vL
vu
(7-75) (7-76)
As the total complexity n is made larger, the phase error decreases for a mixed bandwidth ratio or, for a fixed phase error, the bandwidth ratio will increase. To use Table 7-7, first determine the required bandwidth ratio from the frequencies given. A network is then selected that has a bandwidth ratio vu/vL that exceeds the requirements, and a phase error that is acceptable.
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FIGURE 7-20 Wideband 90 phase-shift networks: (a) the general structure; (b) a passive realization; and (c) an active realization.
A frequency-scaling factor (FSF) is determined from FSF 2pf0
(7-77)
where f0 is the geometric mean of the specified band limits or !fL fu. The tabulated a’s are then multiplied by the FSF for denormalization. The resulting pole-zero pairs can be realized by a cascade of active or passive first-order sections for each network.
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TABLE 7-7 Pole-Zero Locations for 90 Phase-Shift Networks* n
6
6.84
43.3862 2.0264 0.1200
8.3350 0.4935 0.0231
8
2.12
59.7833 4.8947 0.5887 0.0694
14.4159 1.6986 0.2043 0.0167
10
0.66
75.8845 8.3350 1.5279 0.2807 0.0489
20.4679 3.5631 0.6545 0.1200 0.0132
aN
aP
vu /vL 1146
vu /vL 573.0 6
4.99
34.3132 1.9111 0.1416
7.0607 0.5233 0.0291
8
1.39
47.0857 4.3052 0.6153 0.0846
11.8249 1.6253 0.2323 0.0212
10
0.39
59.6517 7.0607 1.4749 0.3114 0.0605
16.5238 3.2112 0.6780 0.1416 0.0168
vu /vL 286.5 4
13.9
16.8937 0.4122
2.4258 0.0592
6
3.43
27.1337 1.8043 0.1669
5.9933 0.5542 0.0369
8
0.84
37.0697 3.7944 0.6424 0.1030
9.7136 1.5566 0.2636 0.0270
10
0.21
46.8657 5.9933 1.4247 0.3449 0.0749
13.3518 2.8993 0.7019 0.1669 0.0213 (Continued)
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TABLE 7-7 Pole-Zero Locations for 90 Phase-Shift Networks (Continued) n
aN
aP
vu /vL 143.2 4
10.2
13.5875 0.4483
2.2308 0.0736
8
0.46
29.3327 3.3531 0.6702 0.1248
8.0126 1.4921 0.2982 0.0341
10
0.10
37.0091 5.1050 1.3772 0.3812 0.0923
10.8375 2.6233 0.7261 0.1959 0.0270
4
7.58
11.4648 0.4789
2.0883 0.0918
6
1.38
18.0294 1.6316 0.2221
4.5017 0.6129 0.0555
8
0.25
24.4451 3.0427 0.6929 0.1451
6.8929 1.4432 0.3287 0.0409
10
0.046
30.7953 4.5017 1.3409 0.4124 0.1086
9.2085 2.4248 0.7458 0.2221 0.0325
4
6.06
10.3270 0.4989
2.0044 0.0968
6
0.99
16.1516 1.5873 0.2401
4.1648 0.6300 0.0619
8
0.16
21.8562 2.8648
6.2817 1.4136
vu /vL 81.85
vu /vL 57.30
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TABLE 7-7 Pole-Zero Locations for 90 Phase-Shift Networks (Continued) n
10
0.026
aN
aP
0.7074 0.1592
0.3491 0.0458
27.5087 4.1648 1.3189 0.4331 0.1201
8.3296 2.3092 0.7582 0.2401 0.0364
vu /vL 28.65 4
3.57º
8.5203 0.5387
1.6157 0.1177
6
0.44º
13.1967 1.5077 0.2773
3.6059 0.6633 0.0758
8
0.056º
17.7957 2.5614 0.7354 0.1890
5.2924 1.3599 0.3904 0.0562
10
0.0069º
22.3618 3.6059 1.2786 0.4743 0.1444
6.9242 2.1085 0.7821 0.2773 0.0447
vu /vL 11.47 4
1.31º
5.9339 0.5055
1.5027 0.1280
6
0.10º
10.4285 1.4180 0.3287
3.0425 0.7052 0.0959
8
0.0075º
14.0087 2.2432 0.7701 0.2310
4.3286 1.2985 0.4458 0.0714
*Numerical values for this table is obtained from S. D. Bedrosian, “Normalized Design of 90 Phase-Difference Networks,” IRE Transactions on Circuit Theory, June 1960.
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FIGURE 7-21 approximation.
Wideband 90 phase-shift
The following example illustrates the design of a 90 phase-shift network. Example 7-5
Design of an Active Wideband 90 Phase Splitter
Required:
Design a network having dual outputs which maintain a phase difference of 90 within
0.2 over the frequency range of 300–3000 Hz. The circuit should be all-pass and active. Result:
(a) Since a 10:1 bandwidth ratio is required (3000 Hz/300 Hz), the design corresponding to n 6 and vu /vL 11.47 is chosen. The phase-shift error will be 0.1. (b) The normalized real pole-zero coordinates for both networks are given as follows: P Network
N Network
a1 10.4285 a2 1.4180 a3 0.3287
a4 3.0425 a5 0.7052 a6 0.0959
The frequency-scaling factor is FSF 2pf0 2p 948.7 5961
(7-77)
where f0 is 2300 3000. The pole-zero coordinates are multiplied by the FSF, resulting in the following set of denormalized values for a: P Network
N Network
ar1 62164 a2r 8453 ar3 1959
ar4 18136 ar5 4204 ar6 571.7
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FIGURE 7-22
313
The wideband 90 phase-shift network of Example 7-5.
(c) The P and N networks can now be realized using the active first-order all-pass circuit of Section 7.2 and Figure 7-11a. If we let Rr 10 k and C 1000 pF, the value of R is given by R
1 a0C
(7-46)
Using the denormalized a’s for the P and N networks, the following values are obtained:
Section
P Network
N Network
1 2 3
R 16.09 k R 118.3 k R 510.5 k
R 55.14 k R 237.9 k R 1.749 M
The final circuit is shown in Figure 7-22 using standard 1-percent resistor values.
7.6 ADJUSTABLE DELAY AND AMPLITUDE EQUALIZERS Delay equalizers were discussed in Section 7.2 and applied to the delay equalization of filters in Section 7.4. Frequently, a transmission channel must be equalized to reduce the delay and amplitude variation. This process is called line conditioning. Since the initial parameters of lines vary and the line characteristics may change from time to time, the equalizer will consist of multiple sections where each stage is required to be adjustable.
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LC Delay Equalizers The circuit of Figure 7-23a illustrates a simplified adjustable LC delay equalizer section. The emitter and collector load resistors Re and Rc are equal, so Q1 serves as a phase splitter. Transistor Q2 is an emitter follower output stage. The equivalent circuit is shown in Figure 7-23b. The transfer function can be determined by superposition as 1 1 s RC LC T(s) 1 1 s2 s RC LC s2
(7-78)
This expression is of the same form as the general second-order all-pass transfer function of Equation (7-6). By equating coefficients, we obtain vr and
1 2LC
Q vrRC
(7-79) (7-80)
Equation (7-80) can be substituted in Equation (7-13) for the maximum delay of a second-order section, resulting in Tgd, max 4RC
(7-81)
By making R variable, the delay can be directly controlled while retaining the all-pass properties. The peak delay will occur at or near the LC resonant frequency.
FIGURE 7-23 Adjustable LC delay equalizer: (a) the adjustable equalizer; (b) equivalent circuit; and (c) operational-amplifier realization.
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The all-pass transfer function of Equation (7-78) can also be implemented using an operational amplifier. This configuration is shown in Figure 7-23c, where Rr is arbitrary. Design Equations (7-79) through (7-81) still apply. Example 7-6 Circuit
Design of an Adjustable LC Delay Equalizer using the Two-Transistor
Required:
Design an adjustable LC delay equalizer using the two-transistor circuit of Figure 7-23a. The delay should be variable from 0.5 to 2.5 ms with a center frequency of 1700 Hz. Result:
Using a capacitor C of 0.05 F, the range of resistance R is given by Tgd,max 0.5 103 2500 Rmin 4C 4.05 106 2.5 103 12.5 k Rmax 4 0.05 106
(7-81)
The inductor is computed by the general formula for resonance v2 LC 1, resulting in an inductance of 175 mH. The circuit is shown in Figure 7-24a. The emitter resistor Re is
FIGURE 7-24 The adjustable delay equalizer of Example 7-6: (a) equalizer circuit; and (b) the delay adjustment range.
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composed of two resistors for proper biasing of phase splitter Q1, and electrolytic capacitors are used for DC blocking. The delay extremes are shown in the curves of Figure 7-24b. LC Delay and Amplitude Equalizers. Frequently, the magnitude response of a transmission channel must be equalized along with the delay. An equalizer circuit featuring both adjustable amplitude and delay is shown in Figure 7-25a. Transistor Q1 serves as a phase splitter where the signal applied to emitter follower Q2 is K times the input signal. The equivalent circuit is illustrated in Figure 7-25b. The transfer function can be determined by superposition as K 1 s RC LC T(s) K 1 s2 s RC LC s2
(7-82)
If K is set equal to unity, the expression is then equivalent to Equation (7-78) corresponding to a second-order all-pass transfer function. As K increases or decreases from unity, a boost or null occurs at midfrequency with an asymptotic return to unity gain at DC and infinity. The amount of amplitude equalization at midfrequency in decibels is given by AdB 20 log K
(7-83)
The maximum delay occurs at the LC resonant frequency and can be derived as Tgd,max
2RC 2RC K
(7-84)
FIGURE 7-25 An adjustable LC delay and amplitude equalizer: (a) adjustable delay and amplitude equalizer; (b) equivalent circuit; and (c) an operational-amplifier realization.
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If K is unity, Equation (7-84) reduces to 4 RC, which is equivalent to Equation (7-81) for the all-pass circuit of Figure 7-23. An operational-amplifier implementation is also shown in Figure 7-25c. The value of Rr is arbitrary, and Equations (7-83) and (7-84) are still applicable. The following conclusions may be reached based on the evaluation of Equations (7-82) through (7-84): 1. The maximum delay is equal to 4 RC for K 1, so R is a delay magnitude control. 2. The maximum delay will be minimally affected by a nonunity K, as is evident from Equation (7-84). 3. The amount of amplitude equalization at the LC resonant frequency is independent of the delay setting and is strictly a function of K. However, the selectivity of the amplitude response is a function of the delay setting and becomes more selective with increased delay. The curves of Figure 7-26 show some typical delay and amplitude characteristics. The interaction between delay and amplitude is not restricted to LC equalizers and will occur whenever the same resonant element, either passive or active, is used to provide both the
FIGURE 7-26 A typical delay and amplitude response for an LC delay and amplitude equalizer: (a) amplitude characteristics for a fixed delay; and (b) the delay variation for 3 dB of amplitude equalization.
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FIGURE 7-27 A DABP delay and amplitude equalizer: (a) adjustable delay equalizer; (b) adjustable delay and amplitude equalizer; and (c) adjustable delay and amplitude equalizer with extended amplitude range.
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amplitude and delay equalization. However, for small amounts of amplitude correction, such as 3 dB, the effect on the delay is minimal. Active Delay and Amplitude Equalizers. The dual-amplifier bandpass (DABP) delay equalizer structure of Section 7.2, under “Active All-Pass Structures,” and Figure 7-13 has a fixed gain and remains all-pass regardless of the design Q. If resistor R1 is made variable, the Q, and therefore the delay, can be directly adjusted with no effect on resonant frequency or the all-pass behavior. The adjustable delay equalizer is shown in Figure 7-27a. The design equations are Tgd, max 4R1C R2 R3
and
1 vrC
(7-85) (7-86)
where C, R, Rr, and Rs, can be conveniently chosen. Resistor R2 can be made variable for frequency trimming. If amplitude equalization capability is also desired, a potentiometer can be introduced, resulting in the circuit of Figure 7-27b. The amplitude equation at vr is given by AdB 20 log (4K 1)
(7-87)
where a K variation of 0.25 to 1 covers an amplitude equalization range of ` to 9.5 dB. To extend the equalization range above 9.5 dB, an additional amplifier can be introduced, as illustrated in Figure 7-27c. The amplitude equalization at vr is then obtained from AdB 20 log (2K 1)
(7-88)
where a K variation of 0.5 to ` results in an infinite range of equalization capability. In reality, a 15-dB maximum range has been found to be more than adequate for most equalization requirements. Example 7-7
Design of an Active Adjustable Delay and Amplitude Equalizer
Required:
Design an adjustable active delay and amplitude equalizer that has a delay adjustment range of 0.5–3 ms, an amplitude range of 12 dB, and a center frequency of 1000 Hz. Result:
The circuit of Figure 7-27c will provide the required delay and amplitude adjustment capability. If we choose C 0.01 F and R Rr Rs 10 k, the element values are computed as follows: R1,min
Tgd,max 4C
R1,max R2 R3
0.5 103 12.5 k 4 108
(7-85)
3 103 75 k 4 108
1 1 15.9 k vrC 2p 1000 108
(7-86)
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FIGURE 7-28
CHAPTER SEVEN
The adjustable delay and amplitude equalizer of Example 7-7.
The extreme values of K for 12 dB of amplitude equalization are found from K
AdB 1 c log 1 a b 1d 2 20
(7-88)
The range of K is then 0.626 to 2.49. The equalizer section is shown in Figure 7-28. Resistor R2 has also been made adjustable for frequency trimming. An active delay equalizer having adjustable delay was implemented by combining a second-order bandpass section with a summing amplifier. The bandpass section was required to have a fixed gain and a resonant frequency which were both independent of the Q setting. If amplitude equalization alone is needed, the bandpass section can operate with a fixed design Q. The low-complexity MFBP delay equalizer section of Figure 7-12a can then be used as an adjustable amplitude equalizer by making one of the summing resistors variable. This circuit is shown in Figure 7-29a. The design equations are given by R2 R1a R1b
2Q vrC
(7-89)
R2 2
(7-90) R1a
2Q 2 1
(7-91)
The amount of amplitude equalization at vr is computed from AdB 20 log¢
1 1≤ K
(7-92)
where K will range from 0 to 1 for an infinite range of amplitude equalization. If the Q is below 0.707, the value of R1b becomes negative, so the circuit of Figure 7-29b is used. R2 is given by Equation (7-89), and R1 is found from R1
R2 4Q 2
(7-93)
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NETWORKS FOR THE TIME DOMAIN
FIGURE 7-29 MFBP amplitude equalizer: (a) amplitude equalizer 0.707 Q 20; and (b) amplitude equalizer 0 Q 20.
The attenuation or boost at resonance is computed from AdB 20 log¢
2Q 2 1≤ K
(7-94)
The magnitude of Q determines the selectivity of the response in the region of resonance and is limited to values typically below 20 because of amplifier limitations. If higher Qs are required, or if a circuit featuring independently adjustable Q and amplitude equalization is desired, the DABP circuits of Figure 7-27 may be used, where R1 becomes the Q adjustment and is given by R1 QR2
(7-95)
To compute the required Q of an amplitude equalizer, first define fb, which is the frequency corresponding to one-half the pad loss (in decibels). The Q is then given by Q
where
fbb 2 2K r fr(b 2 1)
K r log 1 ¢
AdB ≤ 10AdB/20 20
(7-96)
(7-97)
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CHAPTER SEVEN
and
b
fb fr
(7-98)
or
b
fr fb
(7-99)
whichever b is greater than unity.
Example 7-8
Design of an Active Fixed Amplitude Equalizer
Required:
Design a fixed active amplitude equalizer that provides a 12-dB boost at 3200 Hz and has a boost of 6 dB at 2500 Hz. Result:
(a) First, compute K r 10AdB/20 1012>20 3.98 b
and
fr 3200 Hz 1.28 fb 2500 Hz
(7-97) (7-99)
The Q is then found from Q
fbb 2 2K r fr(b 1) 2
2500 1.282 23.98 4.00 3200(1.282 1)
(7-96)
(b) The MFBP amplitude equalizer circuit of Figure 7-29a will be used. Using a C of 0.0047 F and an R of 10 k, the element values are given by R2
2Q 2 4 84.6 k vrC 2p3200 4.7 109
(7-89)
R2 42.3 k 2
(7-90)
R1a R1b K
R1a 2Q 1 2
42.3 103 1365 2 42 1
1 1 0.200 1 10AdB>20 1 1012>20
(7-91)
(7-92)
The equalizer circuit and corresponding frequency response are shown in Figure 7-30.
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323
FIGURE 7-30 The amplitude equalizer of Example 7-8: (a) amplitude equalizer circuit; and (b) frequency response.
BIBLIOGRAPHY Bedrosian, S. D. “Normalized Design of 90 Phase-Difference Networks.” IRE Transactions on Circuit Theory CT-7 (June, 1960). Geffe, P. R. Simplified Modern Filter Design. New York: John F. Rider, 1963. Lindquist, C. S. Active Network Design. Long Beach, California: Steward and Sons, 1977. Wallis, C. M. “Design of Low-Frequency Constant Time Delay Lines.” AIEE Proceedings 71 (1952). Williams, A. B. “An Active Equalizer with Adjustable Amplitude and Delay.” IEEE Transactions on Circuit Theory CT-16 (November, 1969).
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Source: ELECTRONIC FILTER DESIGN HANDBOOK
CHAPTER 8
REFINEMENTS IN LC FILTER DESIGN AND THE USE OF RESISTIVE NETWORKS
8.1 INTRODUCTION The straightforward application of the design techniques outlined for LC filters will not always result in practical element values or desirable circuit configurations. Extreme cases of impedance or bandwidth can produce designs which may be extremely difficult or even impossible to realize. This chapter is concerned mainly with circuit transformations so that impractical designs can be transformed into alternate configurations having the identical response and using more practical elements. Also, the use of resistive networks to supplement LC filters or function independently is covered.
8.2 TAPPED INDUCTORS An extremely useful tool for eliminating impractical element values is the transformer. As the reader may recall from introductory AC circuit analysis, a transformer having a turns ratio N will transform an impedance by a factor of N 2. A parallel element can be shifted between the primary and secondary at will, provided that its impedance is modified by N 2. Figure 8-1 illustrates how a tapped inductor is used to reduce the value of a resonating capacitor. The tuned circuit of Figure 8-1a is first modified by introducing an impedance step-up transformer, as shown in Figure 8-1b, so that capacitor C can be moved to the secondary and reduced by a factor of N 2. This can be carried a step further, resulting in the circuit of Figure 8-1c. The transformer has been absorbed as a continuation of the inductor, resulting in an autotransformer. The ratio of the overall inductance to the tap inductance becomes N 2. As an example, let’s modify the tuned circuit of Example 5-4, shown in Figure 8-2a. To reduce the capacitor from 0.354 F to 0.027 F, the overall inductance is increased by the impedance ratio 0.354 F/0.027 F, resulting in the circuit of Figure 8-2b. The resonant frequency remains unchanged since the overall LC product is still the same. As a further example, let’s consider LC elliptic-function low-pass filters. The parallel resonant circuits may also contain high-capacity values which can be reduced by this method. Figure 8-3 shows a section of a low-pass filter. To reduce the resonating capacitor to 0.1 F, the overall inductance is increased by the factor 1.055 F/0.1 F and a tap is provided at the original inductance value. 325 Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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CHAPTER EIGHT
FIGURE 8-1 The tapped inductor: (a) basic tuned circuit; (b) the introduction of a transformer; and (c) absorbed transformer.
The tapped coil is useful not only for reducing resonating capacitors, but also for transforming entire sections of a filter including terminations. The usefulness of the tapped inductor is limited only by the ingenuity and resourcefulness of the designer. Figure 8-4 illustrates some applications of this technique using designs from previous examples. In the case of Figure 8-4a, where a tapped coil enables operation from unequal terminations, the same result could have been achieved using Bartlett’s bisection theorem or other methods (see Section 3.1). However, the transformer approach results in maximum power transfer (minimum insertion loss). The circuits of Figure 8-4b and c demonstrate how element values can be manipulated by taps. The tapped inductance values shown are all measured from the grounded end of the shunt inductors. Series branches can be manipulated up or down in impedance level by multiplying the shunt inductance taps on both sides of the branch by the desired impedance-scaling factor. Transformers or autotransformers are by no means ideal. Imperfect coupling within the magnetic structure will result in a leakage inductance which can cause spurious responses at higher frequencies, as shown in Figure 8-5. These effects can be minimized by using near-unity
FIGURE 8-2 Reducing the resonant capacitor value: (a) tuned circuit; and (b) modified circuit.
FIGURE 8-3 The application of a tapped inductor in elliptic-function lowpass filters: (a) a filter section; and (b) tapped inductor.
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327
FIGURE 8-4 Applications of tapped inductors: (a) the high-pass filter of Example 4-1 modified for unequal terminations; (b) the filter of Example 5-7 modified for standard capacitor values; and (c) the filter of Example 5-8 modified for standard capacitor values.
turns ratios. Another solution is to leave a portion of the original capacity at the tap for highfrequency bypassing. This method is shown in Figure 8-6.
8.3 CIRCUIT TRANSFORMATIONS Circuit transformations fall into two categories: equivalent circuits or narrowband approximations. The impedance of a circuit branch can be expressed as a ratio of two polynomials in s, similar to a transfer function. If two branches are equivalent, their impedance expressions are identical. A narrowband approximation to a particular filter branch is valid only over a small frequency range. Outside of this region, the impedances depart considerably.
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FIGURE 8-5 filter.
CHAPTER EIGHT
Spurious responses from leakage inductance: (a) in a low-pass filter; and (b) in a bandpass
Thus, the filter response is affected. As a result, narrowband approximations are essentially limited to small percentage bandwidth bandpass filters.
Norton’s Capacitance Transformer Let’s consider the circuit of Figure 8-7a, consisting of impedance Z interconnected between impedances Z1 and Z2. If it is desired to raise impedance Z2 by a factor of N 2 without disturbing an overall transfer function (except for possibly a constant multiplier), a transformer can be introduced, as shown in Figure 8-7b. Determinant manipulation can provide us with an alternate approach. The nodal determinant of a two-port network is given by 2
Y11 Y21
Y12 2 Y22
where Y11 and Y22 are the input and output nodal admittance, respectively, and Y12 and Y21 are the transfer admittances, which are normally equal to each other.
FIGURE 8-6 Preventing spurious response from leakage inductance: (a) initial circuit; (b) split capacity; and (c) transformed circuit.
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329
FIGURE 8-7 Norton’s capacitance transformer: (a) a general two-port network; (b) transformer stepup of output impedance; (c) the Norton impedance transformation; and (d) the Norton capacitance transformation.
If we consider the two-port network of Figure 8-7a, the nodal determinant becomes
4
1 1 Z1 Z 1 Z
1 Z
1 1 Z2 Z
4
To raise the impedance of the output or Y22 node by N 2, the second row and second column are multiplied by 1/N, resulting in
4
1 1 Z1 Z 1 NZ
1 NZ
1 1 2 N 2Z2 NZ
4
This determinant corresponds to the circuit of Figure 8-7c. The Y11 total nodal admittance is unchanged, and the Y22 total nodal admittance has been reduced by N 2, or the impedance has been increased by N 2. This result was originated by Norton and is called Norton’s transformation. If the element Z is a capacitor C, this transformation can be applied to obtain the equivalent circuit of Figure 8-7d. This transformation is important since it can be used to modify
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the impedance on one side of a capacitor by a factor of N 2 without a transformer. However, the output shunt capacitor introduced is negative. A positive capacitor must then be present external to the network so that the negative capacitance can be absorbed. If an N2 of less than unity is used, the impedance at the output node will be reduced. The shunt capacitor at the input node will then become negative and must be absorbed by an external positive capacitor across the input. The following Example illustrates the use of the capacitance transformer. Example 8-1
Using the Capacitance Transformation to Lower Inductor Values
Required:
Using the capacitance transformation, modify the bandpass filter circuit of Figure 5-3c so that the 1.91-H inductor is reduced to 100 mH. The source and load impedances should remain 600 . Result:
(a) The circuit to be transformed is shown in Figure 8-8a. To facilitate the capacitance transformation, the 0.01329 F series capacitor is split into two equal capacitors of twice the value and redrawn in Figure 8-8b. To reduce the 1.91-H inductor to 100 mH, first lower the impedance of the network to the right of the dashed line in Figure 8-8b by a factor of 100 mH/1.91 H, or 0.05236. Using the capacitance transformation of Figure 8-7d, where N 2 0.05236, the circuit of Figure 8-8c is obtained where the input negative capacitor has been absorbed. (b) To complete the transformation, the output node must be transformed back up in impedance to restore the 600- termination. Again using the capacitance transformation with an N 2 of 600 /31.42 or 19.1, the final circuit of Figure 8-8d is obtained. Because of the symmetrical nature of the circuit of Figure 8-8b, both capacitor transformations are also symmetrical. (c) Each parallel resonant circuit is tuned by opening the inductors of the adjacent series resonant circuits, and each series resonant circuit is resonated by shorting the inductors of the adjacent parallel tuned circuits, as shown in Figure 8-8e. Narrowband Approximations A narrowband approximation to a circuit branch consists of an alternate network which is theoretically equivalent only at a single frequency. Nevertheless, good results can be obtained with bandpass filters having small percentage bandwidths typically of up to 20 percent. The series and parallel RL and RC circuits of Table 8-1 are narrowband approximations which are equivalent at v0. This frequency is generally set equal to the bandpass center frequency in Equations (8-1) through (8-8). These equations were derived simply by determining the expressions for the network impedances and then equating the real parts and the imaginary parts to solve for the resistive and reactive components, respectively. Narrowband approximations can be used to manipulate the source and load terminations of bandpass filters. If a parallel RC network is converted to a series RC circuit, it is apparent from Equation (8-8) that the resistor value decreases. When we apply this approximation to a bandpass filter having a parallel resonant circuit as the terminating branch, the source or load resistor can be made smaller. To control the degree of reduction so that a desired termination can be obtained, the shunt capacitor is first subdivided into two capacitors where only one capacitor is associated with the termination.
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FIGURE 8-8 Capacitance transformation applied to the filter of Example 5-2: (a) the bandpass filter of Example 5-2; (b) split series capacitors; (c) the reduction of the 1.91-H inductor using capacitance transformation; (d ) the restoration of the 600- output impedance using capacitance transformation; and (e) equivalent circuits for tuning.
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CHAPTER EIGHT
Narrowband Approximations
These results are illustrated in Figure 8-9. The element values are given by C2
1 v0 2R1R2 R22
1 R1 R2 C1 CT v 0 Å R2R 1 2
and
(8-9)
(8-10)
where the restrictions R2 R1 and (R1 R2) > (R21R2) v20CT2 apply. Example 8-2
Using a Narrowband Transformation to Lower Source Impedance
Required:
Modify the 100 kHz bandpass filter of Example 5.7 for a source impedance of 600 .
FIGURE 8-9 A narrowband transformation of terminations.
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333
FIGURE 8-10 The narrowband source transformation of Example 8-2: (a) source input to the filter of Example 5-7; and (b) transformed source.
Result:
The filter is shown in Figure 8-10a. If we use the narrowband source transformation of Figure 8-9, the values are given by C2
1 v0 2R1R2 R22
1 2p 105 27.32 6 105 6002
792.6 pF
(8-9)
R1 R2 1 884.9 1012 C1 CT v 0 Å R2R 1 2
7.32 103 600 1 157.3 pF 5Å 73202 600 2p 10
(8-10)
The resulting filter is illustrated in Figure 8-10b.
8.4 DESIGNING WITH PARASITIC CAPACITANCE As a first approximation, inductors and capacitors are considered pure lumped reactive elements. Most physical capacitors are nearly perfect reactances. Inductors, on the other hand, have impurities which can be detrimental in many cases. In addition to the highly critical resistive losses, distributed capacity across the coil will occur because of interturn capacitance of the coil winding and other stray capacities involving the core. The equiv- FIGURE 8-11 Equivalent circuit of an inductor. alent circuit of an inductor is shown in Figure 8-11. The result of this distributed capacitance is to create the effect of a parallel resonant circuit instead of an inductor. If the coil is to be located in shunt with an external capacitance, the external capacitor value can be decreased accordingly, thus absorbing the distributed capacitance. The distributed capacity across the inductor in a series resonant circuit causes parallel resonances resulting in nulls in the frequency response. If the self-resonant frequency is too low, the null may even occur in the passband, thus severely distorting the expected response. To determine the effective inductance of a practical inductor, the coil is resonated to the frequency of interest with an external capacitor, and the effective inductance is
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FIGURE 8-12
CHAPTER EIGHT
The effective inductance with frequency.
calculated using the standard formula for resonance. The effective inductance can also be found from L eff
LT f 2 1 ¢ ≤ fr
(8-11)
where LT is the true (low-frequency) inductance, f is the frequency of interest, and fr is the inductor’s self-resonant frequency. As f approaches fr, the value of Leff will increase quite dramatically and will become infinite at self-resonance. Equation (8-11) is plotted in Figure 8-12. To compensate for the effect of distributed capacity in a series resonant circuit, the true inductance LT can be appropriately decreased so that the effective inductance given by Equation (8-11) is the required value. However, the Q of a practical series resonant circuit is given by f 2 Qeff QL B 1 ¢ ≤ R fr
(8-12)
where QL is the Q of the inductor as determined by the series losses (that is, QL vLT /RL). The effective Q is therefore reduced by the distributed capacity. Distributed capacity is determined by the mechanical parameters of the core and winding, and as a result is subject to change due to mechanical stresses, and so on. Therefore, for maximum stability, the distributed capacity should be kept as small as possible. Techniques for minimizing inductor capacity are discussed in Chapter 9. Another form of parasitic capacity is stray capacitance between the circuit nodes and ground. These strays may be especially harmful at high frequencies and with highimpedance nodes. In the case of low-pass filters where the circuit nodes already have shunt
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FIGURE 8-13
335
An elliptic-function bandpass filter.
capacitors to ground, these strays can usually be neglected, especially when the impedance levels are low. A portion of an elliptic-function bandpass filter is shown in Figure 8-13. The stray capacity at nodes not connected to ground by a design capacitor may cause problems since these nodes have high impedances. Geffe (see Bibliography) has derived a transformation to introduce a design capacitor from the junction of the parallel tuned circuits to the ground. The stray capacity can then be absorbed. The design of elliptic-function bandpass filters was discussed in Section 5.1. This transformation is performed upon the filter while it is normalized to a 1-rad/s center frequency and a 1- impedance level. A section of the normalized network is shown in Figure 8-14a. The transformation proceeds as follows: Choose an arbitrary value of m 1, then n1 C0
Lb 1 m Lc m2
(8-13)
1n 1m n2Lc mn2Lb
(8-14)
1n 1 La nLc
(8-15)
1 nLC
(8-16)
1 mn2Lb
(8-17)
1m 1 2 m2n2Lb n Ld
(8-18)
C1
C2 C3 C4 L1
La La 1 n 1 Lb n
(8-19)
L2 nLb
(8-20)
L3 mn2Lc
(8-21)
L4
m2n2Lc Lc m2 1 Ld 1 m
(8-22)
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CHAPTER EIGHT
FIGURE 8-14 A transformation to absorb stray capacitance: (a) normalized filter section; and (b) transformed circuit.
The resulting network is given in Figure 8-14b. The output node has been transformed to an impedance level of m2n2 . Therefore, all the circuitry to the right of this node, up to and including the termination, must be impedance-scaled by this same factor. The filter is subsequently denormalized by scaling to the desired center frequency and impedance level.
8.5 AMPLITUDE EQUALIZATION FOR INADEQUATE Q Insufficient element Q will cause a sagging or rounding of the frequency response in the region of cutoff. Some typical cases are shown in Figure 8-15, where the solid curve represents the theoretical response. Finite Q will also result in less rejection in the vicinity of any stopband zeros and increased filter insertion loss. Amplitude-equalization techniques can be applied to compensate for the sagging response near cutoff. A passive amplitude equalizer will not actually “boost” the corner response,
FIGURE 8-15
The effects of insufficient Q: (a) low-pass response; and (b) bandpass response.
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FIGURE 8-16 Bandpass-type amplitude equalizers: (a) constant-impedance type; (b) series nonconstantimpedance type; and (c) shunt nonconstant-impedance type.
since a gain cannot be achieved as with active equalizer circuits. However, the equalizer will introduce attenuation except in the region of interest, therefore resulting in a boost in terms of the relative response. Amplitude equalizers used for low Q compensation are of the bandpass type. They have either constant-impedance or nonconstant-impedance characteristics. The constant-impedance types can be cascaded with each other and the filter with no interaction. The nonconstant-impedance equalizer sections are less complex but will result in some interaction when cascaded with other networks. However, for a boost of 1 or 2 dB, these effects are usually minimal and can be neglected. Both types of equalizers are shown in Figure 8-16. The nonconstant-impedance type can be used in either the series or shunt form. In general, the shunt form is preferred since the resonating capacitor may be reduced by tapping the inductor. To design a bandpass equalizer, the following characteristics must be determined from the curve to be equalized: AdB total amount of equalization required in decibels fr frequency corresponding to AdB fb frequency corresponding to AdB/2 These parameters are illustrated in Figure 8-17, where the corner response and corresponding equalizer are shown for both upper and lower cutoff frequencies. To design the equalizer, first compute K from AdB 20 logK
(8-23)
Then calculate b where
or
b
fr fb
(8-24)
b
fb fr
(8-25)
selecting whichever b is greater than unity.
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FIGURE 8-17 Bandpass equalization of the corner response: (a) equalization of the upper cutoff; and (b) equalization of the lower cutoff.
The element values corresponding to the sections of Figure 8-16 are found as follows: L1
R0(K 1) 2pfb(b2 1) 2K
C1
L2
1 (2pfr)2L1
R0(b2 1) 2K 2pfbb2(K 1)
C2
1 (2pfr)2L2
R1 R0(K 1) R2
R0 K1
(8-26)
(8-27)
(8-28)
(8-29) (8-30) (8-31)
where R0 is the terminating impedance of the filter. To equalize a low-pass or high-pass filter, a single equalizer is required at the cutoff. For bandpass or band-reject filters, a pair of equalizer sections is needed for the upper and lower cutoff frequencies. The following example illustrates the design of an equalizer to compensate for low Q.
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Example 8-3
Using an Amplitude Equalizer to Compensate for Low Q
Required:
A low-pass filter should have a theoretical roll-off of 0.1 dB at 2975 Hz but has instead the following response in the vicinity of cutoff due to insufficient Q: 0.5 dB 1.0 dB
2850 Hz 2975 Hz
Design a shunt nonconstant-impedance equalizer to restore the sagging response. The filter impedance level is 1000 . Result:
First, make the following preliminary computations: K 10 AdB /20 101/20 1.122 b
then
L2
R0(b2 1) 2K 2pfbb2(K 1) C2
fr 2975 Hz 1.0439 fb 2850 Hz
(8-23) (8-24)
103(1.04392 1) 21.122 40.0 mH (8-28) 2p2850 1.04392(1.122 1)
1 1 0.0715 mF (2pfr)2L2 (2p2975)2 0.04
(8-29)
R0 1000 8197 K1 1.122 1
(8-31)
R2
The resulting equalizer is shown in Figure 8-18 using the circuit of Figure 8-16c.
FIGURE 8-18
The equalizer of Example 8-3.
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8.6 COIL-SAVING ELLIPTIC-FUNCTION BANDPASS FILTERS If an even-order elliptic-function low-pass filter (as shown in Figure 8-19a) is transformed into a bandpass filter using the methods of Section 5.1, the bandpass circuit of Figure 8-19b is obtained. A method has been developed to transform the low-pass filter into the configuration of Figure 8-19c. The transfer function is unchanged except for a constant multiplier, and 1/2 (n2) coils are saved in comparison with the conventional transformation. These structures are called minimum-inductance or zigzag bandpass filters. However, this transformation requires a very large number of calculations (see Saal and Ulbrich in Bibliography) and is therefore considered impractical without a computer. Geffe (see Bibliography) has presented a series of formulas so that this transformation can be performed on an n 4 low-pass network. The normalized low-pass element values for n 4 can be determined with the Filter Solutions program or found in either Zverev’s Handbook of Filter Synthesis or Saal’s “Der Entwurf von Filtern mit Hilfe des Kataloges
FIGURE 8-19 Coil-saving bandpass transformation: (a) an even order elliptic-function low-pass filter; (b) conventional bandpass transformation; and (c) minimum-inductance bandpass transformation.
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341
Normierter Tiefpasse” (see Bibliography). Although these calculations are laborious, the EXCEL spreadsheet of formulas on the CD-ROM performs these computations. The low-pass filter and corresponding bandpass network are shown in Figure 8-20. The following preliminary computations are required. f0 BW v a ` 2Qbp
Qbp
(8-32) (8-33)
x a 2a2 1
(8-34)
c3 t1 1 c 2
(8-35)
T
1 t1x2 t1 x2 QbpT t1
(8-37)
x2 x t1
(8-38)
t1t2 T
(8-39)
k t2
(8-36)
2
t3
a1
1 x2
(8-40)
FIGURE 8-20 The minimum-inductance transformation for n 4: (a) an n 4 low-pass filter; and (b) the transformed bandpass filter.
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b x2 1 C3ka T t2t3 B C3kb A
(8-41) (8-42) (8-43)
The bandpass element values can now be computed as follows: RL t23R
(8-44)
C3kb C11 t t 1 2
(8-45)
C12
C3ka T1
(8-46)
L12
1 x2C12
(8-47)
C11(T 1) t2
(8-48)
C13
x2 C13 C3ka C14 t 2 L13
La
1 C3 Qbp ¢ C1 t ≤ 1
(8-49) (8-50) (8-51)
1 A La
(8-52)
Lb t23QbpL4
(8-53)
1 Lb B
(8-54)
Ca
Cb
The bandpass filter of Figure 8-20b must be denormalized to the required impedance level and center frequency f0. Since the source and load impedance levels are unequal, either the tapped inductor or the capacitance transformation can be used to obtain equal terminations if required. The transmission zero above the passband is provided by the parallel resonance of L12C12 in branch 2, and the lower zero corresponds to the series resonance of L13C13 in branch 3. The circuits of branches 2 and 3 each have conditions of both series and parallel resonance and can be transformed from one form to the other. The following equations relate the type 1 and 2 networks shown in Figure 8-21. For a type 1 network: L1 La ¢ 1
Ca 2 ≤ Cb
(8-55)
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FIGURE 8-21 network.
343
Equivalent branches: (a) type 1 network; and (b) type 2
C1 Cb
C2 Ca
1 Ca 1 Cb 1 1
fseries fpar
Ca Cb
1 2p 2L1C1 1
(8-56)
(8-57)
(8-58) (8-59)
L1C1C2 2p Å C1 C2
For a type 2 network: La L1
1 ¢1
C2 2 ≤ C1
Ca C2 ¢1
C2 ≤ C1
Cb C1 C2 fseries
1 2p 2La(Ca Cb)
fpar
1 2p 2LaCa
(8-60)
(8-61) (8-62) (8-63)
(8-64)
In general, the bandpass series arms are of the type 2 form, and the shunt branches are of the type 1 form, as in Figure 8-19c. The tuning usually consists of adjusting the parallel resonances of the series branches and the series resonances of the shunt branches—in other words, the transmission zeros.
8.7 FILTER TUNING METHODS LC filters are typically assembled using elements with 1- or 2-percent tolerances. For many applications, the deviation in the desired response caused by component variations may be unacceptable, so the adjustment of elements will be required. It has been found that wherever
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FIGURE 8-22 Test circuits for adjusting resonant frequencies: (a) adjusting parallel resonance; and (b) adjusting series resonance.
resonances occur, the LC product of the resonant circuit is significantly more critical than the L/C ratio. As a result, filter adjustment normally involves adjusting each tuned circuit for resonance at the specified frequency. Adjustment techniques are based on the impedance extremes that occur at resonance. In the circuit of Figure 8-22a, an output null will occur at parallel resonance because of voltagedivider action. Series LC circuits are tuned using the circuit of Figure 8-22b, where an output null will also occur at resonance. The adjustment method in both cases involves setting the oscillator for the required frequency and adjusting the variable element, usually the inductor, for an output null. Resistors RL and Rs are chosen so that an approximately 20- to 30-dB drop occurs between the oscillator and the output at resonance. These values can be estimated from RL < and
Rs
M)2) ; I0(b)
M k M
(13-20)
where I0(b) is the modified 0th-order Bessel function ` (x>2)n I0(x) 1 a ¢ ≤ n! n1
2
(13-21)
The parameter b affects the main lobe bandwidth and stopband attenuation trade-off. A Kaiser window is reported in the time and frequency domain, for b 1, 3, and 10, in Figure 13-10. Another parameterizable window is the Dolph-Chebyshev (chebwin in MATLAB) window, given by M
w[k]
2krp rp 1 1 ¢ 2 a Tr ¢ b cos ¢ ≤ ≤ cos ¢ ≤ ≤; 2M 1 g 2M 1 2M 1 r1
M k M (13-22)
where g
Amplitude of side lobe ; Amplitude of main lobe
b cosh ¢
1 1 cosh1 ¢ g ≤ ≤ 2M
(13-23)
and Tk is a kth-order Chebyshev polynomial satisfying Tr(x) e
cos(r cos 1(x)); Zx Z 1 cos(r cosh1(x)); Zx Z 1
(13-24)
The MATLAB defined window functions (Table 13-2, kaiser, and chebwin) can be applied to any symmetric (linear-phase) FIR impulse response. Since the windows are themselves symmetric, a linear-phase FIR will remain linear phase. An example of a window designed FIR is presented in the following example. Example 13-6 Window design method Required:
Consider again the rectangular windowed 21st-order linear-phase Type I-FIR previously introduced in Example 13-5 and Figure 13-8. Apply a 21-sample Hamming window to the FIR impulse response and compare the outcome to the rectangular windowed response. Results:
The outcome is reported in Figure 13-11. Observe that the Hamming window suppresses the large Gibbs overshoot previously located near the transition band edge. The reduction in magnitude frequency response error is seen to be gained at the expense of a widened transition band. Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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Kaiser window 1 0.9 β = 1.0
0.8
β=1 β=3 β = 10
0.7 0.6 0.5 β = 3.0
0.4 0.3
β = 10
0.2 0.1 0
Smaple index 1 0.9 0.8
Magnitude frequency response
β = 1.0
β=1 β=3 β = 10
Magnitude
0.7 β = 3.0
0.6 0.5 0.4 0.3
β = 10
0.2 0.1 0 −0.2
0.2 Normalize frequency
FIGURE 13-10 Kaiser parameterizable window (top) and its magnitude frequency response (bottom). (The frequency axis normalized with respect to fs /2.)
13.10 LEAST SQUARES FIR DESIGN Classic least squares estimation techniques can also be employed to design an FIR. Consider designing a linear-phase FIR that minimizes the weighted MSE criterion: K
K
i1
i1
s a W(vi)Ze(i)Z 2 a W(i)ZH(i) Hd(i)Z 2
(13-25)
where H(i) and Hd(i) are the realized and desired complex frequency responses, respectively, and W(i) 0 is a non-negative error weight applied to the ith frequency location
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Magnitude frequency response
1.4 Rectangular windowed FIR
1.2
Hamming Rectangular
1 Hamming windowed FIR
0.8 0.6 0.4 0.2 0
0
0.1
0.2
0.3 0.4 0.5 0.6 0.7 Normalized frequency
0.8
0.9
1
FIGURE 13-11 Comparison of the window FIR design method using the rectangular and Hamming window. (Frequency axis normalized with respect to fs 2).
i. This defines an MSE optimization problem in the frequency-domain. Recall that the (real) magnitude frequency response of a Type-1 linear-phase FIR, modeled after Equation (13-10), is of the form: M
ZH()Z a hk cos(k)
(13-26)
k0
In a matrix-vector framework, the problem can be restated in terms of: W(1) W(2) HD c W(K) h0 h1 hD T; c hM
W(1)cos(1) W(2)cos(2) c W(K)cos(K)
c c c c
W(1)cos(M1) W(2)cos(M2) T; c W(K)cos(MK)
(13-27)
W(1)Hd(1) W(2)Hd(2) dD T c W(K)Hd(K)
The weighted estimation error would then be e Hh d.
(13-28)
The least squares error estimate is expected to minimize the squared error criteria: s e Te |e|2 (Hh d)T (Hh d) 0
(13-29)
The minimizing coefficient vector h can be obtained by differentiating Equation (13-29) with respect to the parameters of h and setting the derivates to zero, namely: 's/'h 0
(13-30)
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TABLE 13-3 Least Squares FIR Designs Least Squares FIR #1
Least Squares FIR #2
K
M
Gain
Coefficients
K
M
Gain
Coefficients
7
5
Hd (0) 1 Hd (2p/14) 1 Hd (4p/14) 1 Hd (6p/14) 0 Hd (8p/14) 0 Hd (10p/14) 0 Hd (12p/14) 0
h0 0.35 h1 0.569 h2 0.268 h3 0.012 h4 0.167
5
7
Hd (0) 1 Hd (2p/10) 1 Hd (4p/10) 0 Hd (6p/10) 0 Hd (8p/10) 0
h0 0.49 h1 0.222 h2 –0.255 h3 –0.348 h4 0.361 h5 0.246 h6 0.339
which results in a solution that is defined by the so-called normal equation: H THh H Td . h (H TH)1 H Td
(13-31)
The MATLAB fircls function can be used to synthesize a least-squares FIR from a set of discrete frequency domain specifications. The following example illustrates a least squares FIR design. Example 13-7 Least squares design method Required:
Design two least squares FIRs having the gain specifications shown in Table 13-3. One design is parameterized by K 7 and M 5, the other by K 5 and M 7. Compare the outcomes. Results:
The result is reported in Figure 13-12. The system specifications for the case where K 7 and M 5 represents an over-specified solution which lends itself to a successful outcome. The system specifications for the case where K 5 and M 7 represent an under-specified solution which leads to a questionable outcome. Least squares methods are very robust but, like the window method, can suffer from large localized errors. One of the distinct advantages of the least squares method is that errors in the frequency domain can be selectively weighted by the choice of W(i) 0. This provides a means of shaping the realized filter’s spectral response.
13.11
EQUIRIPPLE FIR DESIGN
The equiripple design rule is commonly used to synthesize FIR from a set of frequency domain specifications. The weighted error model for an equiripple design where (), is () W() ZHd(ej) H(ej)Z
(13-32)
The weighted error is defined in terms of a non-negative error weight W() 0 and the difference between the desired (Hd(ej)) and realized (H(ej)) filter’s base-band frequency response. Equiripple FIRs meet the minimax error criteria, which states that an optimum solution satisfies d minimum5maximum(Z()Z)6;
H [0, s/2)
(13-33)
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Magnitude frequency response
1.4 1.2 Least squares FIR K = 7; M = 5
1 0.8 0.6 0.4 Desired
0.2 0
0
0.1
0.2
0.3 0.4 0.5 0.6 0.7 Normalize frequency
0.8
0.9
1
Magnitude frequency response
1.6 1.4 Least squares FIR K = 5; M = 7
1.2 1 0.8 0.6 0.4 0.2 Desired 0
0
0.1
0.2
0.3 0.4 0.5 0.6 0.7 Normalize frequency
0.8
0.9
1
FIGURE 13-12 Comparison of least square FIR designs with K 7 and M 5 (top) and K 5 and M 7 (bottom). (The frequency axis was normalized with respect to fs /2.)
where is called the minimax error, or extremal error. The maximum value of occurs at what are called extremal frequencies e. If (i) is an extremal error measured at the extremal frequencies i, then Z(i)Z Z(j)Z for all i and j. In addition, the signs of the maximal errors are known to alternate from extremal frequency to the next extremal frequency so that (i) (i1). Because all the extremal errors are equal in magnitude and alternating in sign, the resulting filter is referred to as an equiripple FIR. For a linear-phase FIR, the location of the maximum errors can be computed using the alternation theorem from polynomial approximation theory, implemented using the Remez exchange algorithm. The Remez exchange algorithm iteratively adjusts the iteration’s current candidate extremal frequency locations i until the minimax criterion is satisfied to
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0.6 0.5
Amplitude
0.4 0.3 0.2 0.1 0 −0.1 Sample index 1.4 Magnitude frequency response
= Extremal frequency 1.2 1 + δp 1 1 − δp
1 0.8 0.6 0.4 0.2 0
δa 0
0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9 Normalized frequency
1
FIGURE 13-13 An equiripple filter approximation to a desired piecewise constant FIR magnitude frequency response showing the impulse response (top) and magnitude frequency response meeting the minimax error criteria at the extremal frequency locations (bottom). (The frequency axis was normalized with respect to fs /2.)
within a fixed tolerance. This method has been used for several decades to design linearphase FIRs and continues to be reliable. A typical equiripple FIR approximation of a piecewise constant desired filter model (for example, Hd(ej)) is presented in Figure 13-13. The design was conducted using uniform error weights W() 1 for all . The equiripple design objective is shown to be satisfied since the magnitude of the extremal passband and attenuation stopband deviations (errors), denoted p and a respectively, are equal. The filter presented in Figure 13-13, however, demonstrates one of the weaknesses of a uniformly weighted equiripple FIR design. Since the stopband extremal errors (a) are generally small, a uniformly weighted equiripple outcome will also force the passband errors (p) to be likewise small (unrealistically small).
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535
To illustrate, if the equiripple stopband error is 40 dB, then the passband error is likewise 40 dB instead of being a more realistic value of 1 dB or thereabouts. The following example considers the design of a uniformly weighted equiripple FIR. Finally, the MATLAB firpm function can be used to synthesize an equiripple FIR from a set of frequency domain specifications. Example 13-8 Uniformly weighted equiripple FIR Required:
Design a uniformly weighted 51st-order low-pass equiripple FIR that meets the following specifications • Sampling frequency fs 100 kHz: • Frequency band 1 (passband): f H [0.0,10] kHz; desired passband gain 1.0; Wpassband 1.0 • Frequency band 2 (stopband): f H [15,50] kHz; desired stopband gain 0.0; Wstopband 1.0 Results:
An equiripple FIR was designed and is reported in Figure 13-14. The impulse response has the even symmetry that characterizes a Type-1 linear-phase FIR. The equiripple FIR has an exhibited minimum stopband gain of 47.4-dB passband, and the passband error deviation is likewise 47.4 dB or Zdp Z 0.00428. Finally, the worst case filter gain (Equation 13-7) is computed to be Gmax 1.67565 21. The uniform weighting strategy, Wpassband() Wstopband(), results in equal passband and stopband extremal errors (for example, p a). The relationship between p and a can, however, be controlled by choosing dissimilar non-negative error weights (for instance, Wpassband() 2 Wstopband()). This provides a means of realistically controlling the individual passband and stopband gains. Suppose, for illustrative purposes, that 10 Wpassband() Wstopband(). This artificially makes the stopband extremal error 10 times more serious than the passband error. The resulting solution would exhibit a final error deviation of p 10a. In this manner, significant subtle adjustments can be made to the magnitude frequency response envelope of an equiripple design. These relationships can be predicted since the error deviations satisfy d 2dpda
(13-34)
where is the error obtained for a uniformly weighted design (for example, W() 1 for all ). The design of a non-uniformly weighted FIR is presented in the following example. Example 13-9 Non-uniformly weighted equiripple FIR Required:
Design a non-uniform weighted 51st-order low-pass equiripple FIR that meets the specifications defined in Example 13-8. Example 13-8 considered a uniformly weighted equiripple FIR design for Wpassband() Wstopband() 1.0, which resulted in a measured stop-band gain that was 47.4 dB and an identical passband error deviation of 47.4 dB, or 0.00428. The passband gain is therefore 1 0.00428, a value that is often considered to be overly restrictive and should therefore be relaxed. A passband deviation on the order of 0.1, or 20 dB, may be considered to be more realistic. Explore relaxing the passband gain using error weights.
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0.3 0.25
Amplitude
0.2 0.15 0.1 0.05 0 −0.05
0
5
10
15
20 25 30 Sample index
35
40
45
50
4
4.5
5
Magnitude frequency response (dB)
20 0 −20 −47.4 dB
−40 −60 −80 −100 −120
0
0.5
1
1.5
2 2.5 3 Frequency
3.5
x 104
FIGURE 13-14 A uniformly weighted low-pass equiripple Type-1 FIR: impulse response (top), and magnitude frequency response in dB units (bottom). Results:
Relaxing the passband error deviation and increasing the stopband attenuation can be achieved by assigning the stopband error weight to be more significant than the passband errors. To illustrate, consider setting the stopband error weight to be 1,000 times greater than the passband weight (for example, 1,000 Wpassband() Wstopband()). The equiripple weighted and uniformly weighted FIR design outcomes are reported in Figure 13-15. The weighted design passband deviation is measured to be approximately p 0.0954302 ~ (0.1) and the stopband weight is approximately a 79 dB. Thus, the relaxation of the passband error deviation facilitated an increase in stopband attenuation by 31.6 dB. That is, p ~ 0.1 and a ~ 0.00018. From this, d !dpda 0.00424264, which is essentially the value of the uniformly weighted value of reported in Example 13-8. The worst case gain of the filter is noted to be Gmax = 1.72627 21, which is a slight increase over the uniformly weighted case.
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1.4 Uniform Non-uniform
1.2 1 0.8
Uniform weight
0.6
Non-uniform weight 0.4 0.2 0
0 0.5 1 1.5 2 2.5 3.0 3.5 4 4.5 5 Frequency
x
Magnitude frequency response (dB)
Magnitude frequency response
FINITE IMPULSE-RESPONSE FILTERS
20 0 −20 −40 −47.4 −60 −80
Uniform Non-uniform Uniform weight Non-uniform weight
−79
−100 −120 −140
0 0.5 1 1.5 2 2.5 3.0 3.5 4 4.5 5
104
Frequency
x 104
FIGURE 13-15 Uniform and non-uniform weighted low-pass equiripple Type-1 FIRs. Shown are the magnitude frequency response (left), and the magnitude frequency response in dB units (right).
There are several algorithms found in common use that translate the FIR design parameters (p, a, p, a) into equiripple FIR filter order estimates. The most popular analytic estimation formula is given by NFIR
N 1
z
A[n]/f(n)
1 ej 2 n p >N z 1
,
n H [0, N 1]
(13-56)
The poles of the resonator filter are located along the periphery of the unit circle at locations z ej2n/N. For stability reasons, the filter poles and zeros are often moved slightly interior to the unit circle to reside on an arc of a radius r (for instance, z rej2n/N), where r 1 but is close to unity. Since the complex resonator poles occur in complex conjugate pairs, they can be paired together to define second-order resonator filters having only real coefficients. Collectively, a 2nd-order frequency sampling filter is given by H(z)
(1 r Nz N) Hd[0] ¢ N 1 rz 1
r cos(f(n) 2 p n/N)z 1) ≤, 1 2r cos(2 p n/N)z 1 r 2z 2
(N1)/2 2A[n](cos(f(n))
a
n1
(13-57) if N is odd. If N is even, then H(z)
Hd[N 1] Hd[0] (1 r Nz N) ¢ N 1 rz 1 1 rz 1 r cos(f(n) 2 p n/N)z 1) ≤ 1 2r cos(2 p n/N)z 1 r 2z 2
N/21 2A[n](cos (f(n))
a
n1
(13-58)
The frequency sampling method has been successfully used for some time to design FIR filters having an arbitrary magnitude frequency response envelope. Such filter designs are resource-efficient when the width of the active passband is small compared to the width of the stopband. In this instance, most of the sub-band filters will have zero gain (such as, A[n] 0) and can therefore be left unimplemented. Frequency sampling filters have, however, acknowledged limitations. Design problems can occur when a frequency sampling filter is required to model an ideal piecewise constant filter response characterized by ZH(n)Z 1 and ZH(n 1)Z 0 (in other words, an abrupt change) leading to spectral distortions due to
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Ideal model
1
0
0
0.5
Relaxed model
1
0
0
Normalized frequency
0.5 Normalized frequency
FIGURE 13-25 The frequency response of a frequency sampling filter modeling a zero-phase ideal lowpass (left) and relaxed zero-phase low-pass filter model (right). (The frequency axis was normalized with respect to fs.)
Gibb’s phenomenon. The problem can be mitigated, to a degree, by relaxing the transition band condition so that ZH(n)Z 1 a and Z H(n 1) Z for 0 1.0. This will reduce the slope of the skirt of the filter so it can be more easily modeled by an IDFT. The frequency sampling design strategies are illustrated in following example. Example 13-16 Frequency sampling FIR Required:
Design a 15th-order frequency sampling low-pass FIR that emulates an ideal low-pass filter having a normalized transition band centered about 0.5. The phase response is assumed to be zero (in other words, (n) 0) which actually means that the phase shift at any harmonic frequency can be an integer multiple of 2. Compare the response to that of a frequency sampling filter having a linear transition band. The target magnitude frequency responses are graphically interpreted in Figure 13-25. Results:
The frequency sampling filter’s center frequencies are located at n 2n/15 0.4188n, n [0, 14]. The (desired) filter response establishes that Hd(n) e
1 j0, n H [0, 3], n H [12, 14] 0 j0, n H [4, 11]
where n [0, 7] corresponds to positive frequencies and n [9, 14] refers to negative frequencies. Notice that only 7 of 15 possible filters need to be implemented. The frequency sampling filter, based on the desired filter gain weights, is H(z)
3 2(1 cos(2pn>15)z 1) (1 z 15) 1 ≤ ¢ a 1 15 1 z 1 z 2 n1 1 2 cos(2pn/15)z
The comparison filter is defined in terms of relaxed weights, which should create a smoother transition band. The weights of the relaxed filter (for example, 0.23) are H(3) H(12) 0.707 and H(4) H(11) 0.23. The frequency response of the two frequency sampling filter models are shown in Figure 13-25. Observe that there is significant amplitude ripple and overshoot in the vicinity of the transition band of the sharp transition band design. The relaxed filter design is seen to lessen the overshoot (ripple) locally about the transition band. Also note that neither design produces responses that are truly close replicas of the desired response. To achieve an adequate fit, a filter order much greater than 15 would be required. However, it should be remembered that both filters are specified to be zero-phase designs. Replacing this condition with a linear-phase requirement can significantly improve the quality of the response, as the next example illustrates.
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125-sample impulse response 1.0 0.707
h[k]
|H(e jϖ)|
Zoom window 0.221
Fourier transform 0
0.5 Normalized frequency
FIGURE 13-26 A frequency sampling FIR impulse response (left) and a magnitude frequency response with zoom expansion (right). (The frequency axis was normalized with respect to fs.)
Example 13-17 Frequency sampling FIR Required:
A linear-phase frequency sampling bandpass filter must be designed. The passband ranges over 300 to 700 Hz and the sample rate is 12.5 kHz. Assume that the resonant narrow-band filters are to be set on 100 Hz centers, which defines the filter order to be N 125. The filter is to have a Type-I linear-phase response (odd order, even symmetry) with the phase shift set to radians per 100 Hz. This condition states that Hd(n) (1)n A(n), as defined next. f 200 Hz f 300 Hz f 400 Hz f 500 Hz f 600 Hz f 700 Hz f 800 Hz
Gain and Phase Assignments A(2) 0.221 (2)mod(2) 0 A(3) 0.707 (3)mod(2) A(4) 1 (4)mod(2) 0 A(5) 1 (5)mod(2) A(6) 1 (6)mod(2) 0 A(7) 0.707 (7)mod(2) A(8) 0.221 (8)mod(2) 0
H(2) 0.221 H(3) –0.707 H(4) 1 H(5) –1 H(6) 1 H(7) 0.707 H(8) 0.221
Results:
The resulting impulse and magnitude frequency response of the frequency sampling filter is shown in Figure 13-26. Notice that the impulse response has a symmetric shape around the center tap coefficient, suggestive of a linear-phase filter. The magnitude frequency response is also seen to follow the general shape of the desired filter response.
13.19
SAVITZKY-GOLAY FIR FILTERS
Savitzky-Golay (SG) smoothing filters (also called digital smoothing polynomial filters or least squares smoothing filters) are used to reduce the effects of broadband noise. In such applications, SG smoothing filters are claimed to outperform a standard FIR moving averaging filter, which tends to filter out a significant portion of a high-frequency signal as well as noise. While SG filters may be more effective in preserving pertinent high-frequency signal components, they are less successful than standard averaging FIR filters in rejecting noise.
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FIGURE 13-27
551
A linear interpolation (left) and a cubic polynomial interpolation (right).
SG filters are actually a family of filters which are used to smooth data using polynomial interpolation. They process data in an L sample block. The SG smoothing strategy is designed to preserve higher-order statistical moments and are based on least squares techniques that fit a low-order polynomial (typically quadratic or quadric) to a collection of data samples, as shown in Figure 13-27. An example of an SG filter is presented in the next example. Example 13-18 Savitzky-Golay filter Required:
Use a 4th-order SG interpolating filter to suppress (smooth) the noise in a chirp signal process for a data frame of length L 33 (16 samples in the past, 16 samples in the future, and the current sample). Compare the results to a 33rd-order moving average FIR. Results:
The responses of a standard 33-sample moving average and SG smoothing filter based on quadric polynomial interpolation are shown in Figure 13-28. The standard moving average FIR is seen to perform well as a de-noising agent when the signal frequency is low, but becomes problematic at high frequencies due to amplitude roll-off. The SG filter maintains essentially a constant amplitude capability across the entire spectrum. At low frequencies, however, the moving average FIR outperforms the SG filter.
13.20
RAISED FIR FILTERS
The raised cosine and root raised cosine filters are common to digital data communications applications. Their use is motivated by their ability to limit inter-symbol interference (ISI). The frequency response of a raised cosine filter is given by 1; c(1 a) H() • 0; c(1 a) (1 cos(2ac)/2); c(1 a) c(1 a)
(13-59)
where is called the “roll-off ” parameter. The impulse response of the raised cosine filter is given by hk
cos(2akfc/fs) 1 sinc(2kfc/fs) fs 1 (4akfc/fs)2
(13-60)
The magnitude frequency response of an ideal raised cosine low-pass filter is unity across the passband with a cosine transition into a zero-gain stopband. The magnitude frequency response and impulse response are graphically interpreted in Figure 13-29.
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Noisy chirp signal
2 1 0 −1 0
0.1
0.2
0.3
0.4
0.5
0.6
0.7
0.8
0.9
1
0.7
0.8
0.9
1
0.7
0.8
0.9
1
Moving average
1
Amplitude range
−2
0 −1 −2
0
0.1
0.2
0.3
0.4
0.5
0.6
Savitzky-golary Amplitude range
2 1 0 −1 −2
0
0.1
FIGURE 13-28
0.2
0.3
0.4
0.5
0.6
The responses of a moving average and SG filter to a noise added up-chirp signal.
A root raised cosine filter is used when the raised cosine filtering load is to be spread equally between the transmitter and receiver. The root raised cosine filter’s frequency response satisfies 1; c(1 a) H() • 0; c(1 a) 2(1 cos(/2ac)/2); c(1 a) c(1 a)
(13-61)
Magnitude frequency response
0.3 0.25
Amplitude
0.2 0.15 0.1 0.05 0 −0.05
0
2
4
6
8 10 12 14 16 18 20 Sample index
Cosine envelop
0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9 1. Frequency
FIGURE 13-29 A raised cosine impulse response (left) and a magnitude frequency response (right). (The frequency axis was normalized with respect to fs /2.)
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and the root raised cosine filter’s impulse response satisfies hk
13.21
1 4a cos((1 a)2pkfc/fs) sin((1 a)2pkfc/fs)/(8akfc/fs) pfs 1 ¢ ≤((8akfc/fs)2 1) Ç 2fc
(13-62)
MATLAB FIR SUPPORT
Caveat: MATLAB assumes that the order of an FIR is equal to the order of the polynomial H(z) rather than the number of filter coefficient slots in H(z), which is the custom. As a result, the usual Nth-order FIR filter is represented as an (N 1)storder FIR in MATLAB. Mathwork’s MATLAB, as well as a number of other commercial signal processing software packages, can greatly simplify the FIR design process. It should be expected, however, that individual design routines will be in some state of revision, inclusion, or retirement. As a result, the software reviewed in this section may or may not be available to the reader in the future. Furthermore, software functions routinely may appear repackaged under various names in different software bundles or toolkits. At present, the primary sources of MATLAB FIR design software support are • SPT Signal Processing Toolbox • FT Filter Design Toolbox • FT2 Filter Design Toolbox 2 The basic software options are listed in Table 13-4. Details regarding their functionality and syntax can be found online or by using the product’s “help” apparatus. Traditional FIR modules, appearing in the Signal Processing Toolbox (SPT), are motivated using examples found in Figure 13-30 and Table 13-5.
13.22
FIR ARCHITECTURES
FIRs can be physically implemented in software and/or hardware. Software solutions are realized using programmable general-purpose microprocessors (p) or digital signal processing microprocessors (DSP p). Hardware-based solutions are packaged in field-programmable logic arrays (FPGA), or application-specific integrated circuits (ASIC). In all cases, the FIRs are defined in terms of adder, multiplier, shift-register, memory, and data input/output building blocks. How these elements are interconnected establishes the filter’s architecture. There are several basic FIR-specific architectures that are singled out for special attention.
13.23
DIRECT FORM FIR
An Nth-order causal FIR, having an impulse response h[k], can be expressed in transfer function form as N1
H(z) a hkz k
(13-63)
k0
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TABLE 13-4 MATLAB FIR Support Function
Source
Description
cfirpm
SPT
fir1 fir2
SPT SPT
fircband fircegrip
FT FT
fircls fircls1
SPT SPT
firgr
FT
firhalfband firlpnorm firls firnyquist firpm
FT2 FT SPT FT2 SPT
firpmord
SPT
firpr2chfb
FT2
firrcos gaussfir gremez ifir intfilt kaiserord
SPT SPT FT2 FT2 SPT SPT
sgolay
SPT
Design a linear, complex, and nonlinear-phase equiripple FIR. Design a window-based finite impulse response filter. Design a frequency sampling-based finite impulse response filter. Design an FIR with constrains on the stopbands. Design constrained, equiripple, and finite impulse response (FIR) filters. Design a constrained least square multiband filter. Design a constrained least square low-pass and high-pass linear-phase FIR filter. Design, using the Parks-McClellan method, an equiripple, Hilbert, and differentiator FIR. Design a half-band FIR filter. Design an FIR with respect to an Lp norm. Design a least square linear-phase FIR filter. Design an equiripple Nyquist FIR. Design, using Parks-McClellan, an optimal FIR filter design (a.k.a., Remez). Design a Parks-McClellan optimal FIR filter order estimation. Design an FIR perfect reconstruction two-channel filter bank. Design a raised cosine FIR. Design a gaussian FIR. Design a generalized FIR using the Remez method. Design an interpolating FIR filter. Design an interpolating FIR. Estimate parameters for an FIR filter design with a Kaiser window. Design a Savitzky-Golay filter.
Example
Figure 13-30a Figure 13-30b
Figure 13-30c Figure 13-30d
Figure 13-30e
Figure 13-30f
The most common implementation of this FIR is called the direct form FIR architecture, which is interpreted in Figure 13-31. The FIR’s impulse response can be directly inferred from the architecture to be h[k]. A direct form FIR consists of a collection of N 1 shiftregisters and N tap-weight coefficients hk with attendant multipliers and adders. For each input sample x[k], a direct FIR would implement the following set of arithmetic operations: For each input sample x[k], do x0 x[k] y[k] h0 x0 h1x1 . . . hN1xN1
(13-64)
{update FIFO stack} xN–1 xN–2 ...... x2 x1 x1 x0
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TABLE 13-5 Traditional FIR Signal Processing Toolbox Support—LP low pass, HP high pass, BP band pass, BS band stop, Hil Hilbert, and Diff differentiator Function: fir1
1.4
HP ✓
BP ✓
BS ✓
Hil
Diff
Example: Design a 49-tap FIR window method bandpass FIR (order 48 in MATLAB). The normalized passband range is 0.35 v 0.65:
1.2 Magnitude
LP ✓
1 0.8 0.6 0.4
MATLAB: b = fir1(48,[0.35 0.65]);
0.2 0
0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9 1 Normalized frequency
FIGURE 13-30a
Function: fir2 HP ✓
BP ✓
BS ✓
Hil
Diff
Example: Design a 31-tap low-pass filter (order 30 in MATLAB) having a unity gain to 0.6 of the Nyquist frequency, 0 elsewhere.
1.4 1.2 Magnitude
LP ✓
1 0.8 0.6 0.4
MATLAB: f = [0 0.6 0.6 1]; m = [1 1 0 0]; b = fir2(30,f,m);
0.2 0
0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9 1 Normalized frequency
FIGURE 13-30b
Function: fircls
1.4
HP ✓
BP ✓
BS ✓
Hil
Diff
Example: Design an order 151 (order 150 MATLAB) bandpass filter having a 0.4 passband with 0.02 bounds and 0.01 stopband bounds. MATLAB: n = 150; f = [0 0.2 0.6 1]; a = [0 1 0]; up = [.01 1.02 .01]; lo = [–.01 .98 –.01]; b = fircls(n,f,a,up,lo);
1.2 1 Magnitude
LP ✓
0.8 0.6 0.4 0.2 0
0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9 1 Normalized frequency
FIGURE 13-30c
(Continued)
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TABLE 13-5 Traditional FIR Signal Processing Toolbox Support—LP low pass, HP high pass, BP band pass, BS band stop, Hil Hilbert, and Diff differentiator (Continued) Function: fircls1
1.4
HP ✓
BP
BS
Hil
Diff
Example: Design an order 54 (order 55 MATLAB) low- pass filter with a cutoff frequency located at 0.3:
1.2 1 Magnitude
LP ✓
0.8 0.6 0.4
MATLAB: n = 55; wo = 0.3; dp = 0.02; ds = 0.008; b = fircls1(n,wo,dp,ds,’both’);
0.2 0
0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9 1 Normalized frequency
FIGURE 13-30d
LP ✓
HP ✓
BP ✓
BS ✓
Hil ✓
Diff ✓
Example: Design a 25-tap anti-symmetric Hilbert filter (order 24 in MATLAB) with piecewise linear passbands, and plot the desired and actual frequency response:
Magnitude
Function: firls
MATLAB: F = [0 0.3 0.4 0.6 0.7 0.9]; A = [0 1 0 0 0.5 0.5]; b = firls(24,F,A, ‘hilbert’);
1 0.9 0.8 0.7 0.6 0.5 0.4 0.3 0.2 0.1 0
0 0.1 0.2 0.3 0.4 0.5 0.6 .07 0.8 0.9 1 Normalized frequency
FIGURE 13-30e
Function: fircos
1.4
HP
BP
BS
Hil
Diff
Example: Design a 21-tap raised cosine FIR filter (order 20 in MATLAB) with a cutoff frequency 0.25 of the Nyquist frequency and a transition bandwidth of 0.25: MATLAB: h = firrcos(20,0.25,0.25);
1.2 1 Magnitude
LP ✓
0.8 0.6 0.4 0.2 0
0 0.1 0.2 0.3 0.4 0.5 0.6 .07 0.8 0.9 1 Normalized frequency
FIGURE 13-30f
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x [k ]
T
…
T h1
h0
h2
Σ FIGURE 13-31
T hN−1 …
Σ
Σ
y [k ]
A direct Nth-order FIR architecture.
FIRs are well suited for implementation using this sample-by-sample computational process. Once initiated, the routine would be continually repeated over the filter’s life cycle. The designers of modern DSP microprocessors have learned how to efficiently implement an array of multiply-accumulate (MAC) calls associated with a sum-of-products or S AX Y (SAXPY) algorithms. Many existing DSP microprocessors continue to contain a single MAC unit and data memory, configured as RAM and coefficients memory, fashioned using either RAM or ROM. In many cases, dual-port memory is used to simultaneously supply two operands (xj, hi) to the MAC per memory cycle. Coefficients can also be read to and from memory in a circular modulo(N) manner, repeating a fixed sequence each filter cycle. Since many DSP microprocessors can execute an instruction in a single cycle, the computational latency of a single filter cycle can be estimated to be TFIR_cycle > (N 1)Tinstcycle
(13-65)
The emulation of a direct FIR in a high-level language, such as MATLAB, is a straightforward process. For example, MATLAB’s dfilt.dffir function can be used to convert a transfer function H(z) into a direct form FIR. The direct FIR architecture is illustrated in the following example. Example 13-19 Direct architecture FIR Required:
Implement an FIR with a transfer function H(z) 1 (13/24)z1 (5/8)z2 (1/3)z3 as a direct FIR. Results:
The direct form FIR is shown in Figure 13-32.
13.24
TRANSPOSE FORM FIR
Another baseline FIR form is the transpose FIR architecture, which is a variation on the direct form. The transpose architecture is shown in Figure 13-33. The FIR’s impulse response can be directly inferred from the architecture to be h[k]. For implementations involving
x [k ]
T
T
1 Σ FIGURE 13-32
T 5/8
13/24 Σ
1/3 Σ
y [k ]
A direct 3rd-order FIR architecture.
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x[k] hN−2
hN−1 Σ
T FIGURE 13-33
h0
h1 …
T
Σ
Σ
T
y [k ]
A transpose Nth-order FIR architecture.
MATLAB, dfilt.dffirt can be used to convert a transfer function H(z) into a transpose form FIR. An example of a transpose FIR architecture can be found in the next example. Example 13-20 Transpose architecture FIR Required:
Implement an FIR with a transfer function H(z) 1 (13/24)z–1 (5/8)z–2 (1/3)z–3 as a transpose FIR. Results:
The transpose architecture is shown in Figure 13-34.
13.25
SYMMETRIC FORM FIR
Many baseline FIRs are linear-phase filters and, as a result, possess either even or odd coefficient symmetry. Coefficient symmetry permits the direct form FIR architecture to be modified as shown in Figure 13-35. The result is called a symmetric FIR architecture. The advantage of this architecture is a reduced multiplier budget. If the implementation technology allows additions to be performed at a faster rater than multiplication (such as with ASICs), then a symmetric FIR can have a higher real-time bandwidth (filter cycles per unit time) compared to an equivalent direct form FIR. In some pipelined hardware systems, multiply and add rates are identical, which places the architecture shown in Figure 13-35 at a disadvantage due to its increased adder count. Conventional DSP microprocessors are also designed to optimize multiply-accumulate data flow while other operations, such as addmultiply-add, are not. As a result, symmetric FIR architectures are not necessarily synergistic with general purpose DSP microprocessors. For implementations involving MATLAB, dfilt.dfsymfir can be used to convert a transfer function H(z) of even symmetry into a symmetric form FIR. If odd symmetry is present, then dfilt.dfasymfir is used.
13.26
LATTICE FORM FIR
The direct, transpose, and symmetric form FIR architecture is often used to implement linear-phase FIRs. Another important class of FIR is called the lattice architecture. Lattice architectures are normally associated with non–linear-phase filters. An Nth-order lattice FIR x[k]
T FIGURE 13-34
13/24
5/8
1/3 Σ
T
Σ
1 T
Σ
y [k ]
A transpose 3rd-order FIR architecture.
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x [k−1] x [k ]
x [k−2]
x [k−3]
T
T
T
T
T
T
x [k−6]
x [k−5]
Σ
x [k−4]
Σ
Σ h1
h0 Σ
h2
Σ
FIGURE 13-35
h3
Σ
Σ
y [k ]
A symmetric 7th-order FIR architecture.
is shown in Figure 13-36. Compared to an Nth-order direct and transpose FIR, it can be seen that a lattice filter requires twice the number of multiplies per filter cycle (N versus 2N). Therefore, a lattice filter is physically more complex than a baseline direct, transpose, and symmetric FIR. Nevertheless, a lattice FIR is often preferred over the direct FIR due to the architecture’s known ability to suppress coefficient roundoff and other finite wordlength arithmetic effects. In addition, lattice structures are important to the design of adaptive filters (for example, LPC) and applications where linear-phase is not a requirement. The lattice architecture shown in Figure 13-36 can implement a monic FIR filter having a transfer function N1
A(z) B 1.0 a ajz j R
(13-66)
j1
The transfer function is defined in terms of coefficients aj in order to differentiate Equation (13-66) from Equation (13-63). In lattice form, the transfer function given in Equation (13-66) is expressed in terms of so-called PARCOR (partial correlation) coefficients ki, as shown in Figure 13-36. The PARCOR coefficients can be reconciled with those of the transfer function H(z) found in Equation (13-63) in an iterative manner using the signal taps, Ai(z) and Bi(z) (see Figure 13-37) as intermediate rubrics. Specifically, the conversion of PARCOR coefficients to transfer function coefficients, for an iteration index i 1, 2, . . . , N, begins with the assignments A0(z) B0(z) 1.0
(13-67)
Am(z) Am1(z) kmz 1Bm1(z); m H [1, N 1]
(13-68)
Bm(z) z mAm(z 1); m H [1, N 1]
Σ
x[k]
T FIGURE 13-36
Σ
…
k0
k1
kN−1
k0
k1
kN−1
Σ
T
Σ
…
T
Σ
y [k ]
Σ
w [k ]
A lattice FIR architecture.
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A1(z )
A2 (z )
Σ
X(z )
z −1
…
Σ
k0
k1
k2
k0
k1
k2
z −1
Σ
…
Σ
B1(z ) FIGURE 13-37
AN (z )
z −1
B2 (z )
Σ
Y (z)
Σ
W (z ) B N (z )
A lattice FIR interpreted in the z-domain.
where the last relation states that Bm(z) is simply Am(z) written in reverse order. Finally, it can be shown that AN(z) H(z). To reverse the conversion process, begin with the transfer function and end with the PARCOR coefficients. The iterative process is defined in terms of Am1(z)
Am(z) kmBm(z) 1 k 2m
;
m H [1, N 1]
(13-69)
The intermediate transfer functions Am(z) and Bm(z) are shown in Figure 13-37. For implementations involving MATLAB, dfilt.latticeamax can be used to convert a transfer function H(z) into a maximum phase lattice FIR. The MATLAB function dfilt. latticeamin is used to convert a transfer function H(z) into a minimum phase lattice FIR. The design of a lattice form FIR is illustrated in following example. Example 13-21 Lattice/direct architecture conversion Required:
Suppose a 3rd-order lattice filter has PARCOR coefficients k1 1/4, k2 1/2, and k3 1/3. Determine the coefficients of the equivalent direct FIR. Results:
The direct filter coefficients can be computed as follows: m 1 2
3
Am(z) 1 A1(z) A0(z) k1z 1B0(z) 1 k1z 1 1 z 1 4 1 1 1 A2(z) A1(z) k2z 1B1(z) 1 z 1 z 1 a z 1 b 4 2 4 3 1 1 2 1 z z 8 2 3 1 A3(z) A2(z) k3z 1B2(z) 1 z 1 z 2 8 2 3 13 5 1 2 1 1 z a z 1 z 1 b 1 z 1 z 2 z 3 A(z) 3 2 8 24 8 3
Bm(z) B1(z) z 1A1(z 1)
1 z 1 4
B2(z) z 2A2(z 1) 3 1 z 1 z 1 2 8 B3(z) not required B3(z) z 3
13 2 5 1 z z 1 24 8 3
The FIR’s transfer function is realized as A(z) A3(z). As a side note, the polynomials A1(z), B1(z), A2(z), B2(z), A3(z), and B4(z) correspond to the transfer functions located in
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x[k]
T
T
1
T
13/24
5/8
Σ
1/3
Σ
Σ
A1
A2
Σ
x [k ]
A3
Σ
1/4
1/2
1/3
1/4
1/2
1/3
Σ
T
Σ
T
T B2
B1 FIGURE 13-38
y [k ]
Σ
y (k )
Σ
w [k ] B3
Direct (top) and lattice (bottom) FIR filters in the z-domain.
the positions shown in Figure 13-38. The process is reversible in that the direct FIR coefficients {1, 13/24, 5/8, 1/3} can be converted into the lattice filter PARCOR coefficients as shown next. m 3
Am(z) A(z) A3(z) 1
Bm(z) 13 1 z 24
k3 a3
1 3
5 13 1 z 1 z 2 z 2 3 8 24
5 2 1 z z 2 8 3 2
A2(z)
A3(z) k3z 1B3(z)
3 1 z 1 8 1
A1(z)
B3(z) z 3A3(z 1)
1 k 23 1 2 z 2
A2(z) k3z 1B2(z) 1 k 22
k2 a2
1 2
B2(z) z 2A2(z 1)
k1 a1
1 4
B 1(z) not required
3 1 z 1 z 1 2 8
1 1 z 1 4
These results are summarized in Figure 13-38.
13.27
DISTRIBUTED ARITHMETIC
Upon close inspection of a typical FIR modeled after Equation (13-3), one notes that the FIR coefficients hi are generally real and known a-priori. As a result, the partial convolution product terms hi x[i k] are technically defined by a process known as scaling rather then multiplication. One of the most attractive alternatives to implementing fixed-coefficient FIRs
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is to replace a traditional general-purpose multiplier with lookup table (LUT) calls to semiconductor memory. The LUT method simply emulates how children were taught to multiply by memorizing the multiplication tables. A popular LUT-based technology is called distributed arithmetic (DA). A DA filter assumes that data is coded as an M-bit 2’s-complement data word. Specifically defined M1
x[k] x[k : 0] a x[k : i]2i
(13-70)
i1
where x[k : i] is the ith-bit of sample x[k]. Substituting Equation (13-70) into the linear convolution Equation (13-2), we obtain N1
N1
y[k] a hr ¢ x[k r : 0] a x[k r : i]2i ≤ r0
i1
N1
N1M1
r0
r0 i1
a hrx[k r : 0] a a hrx[k r : i]2i
(13-71)
Upon reversing the order of the double summation, the following results: N1
M1
N1
r0
i1
r0
y[k] a hrx[k r : 0] a 2i a hrx[k r : i]
(13-72)
Suppose that a 2N-word memory lookup table, denoted u[x[k] : i] contains the preprogrammed mapping shown in Equation (13-72). The LUT is addressable by an N-bit address vector x[k : i] 5x[k : i], x[k 1:i], c, x[k N 1 : i]6 , where x[r:i] is a binary-value digit {0,1}. Furthermore, the output word width of the memory table [x[k]:i] is assumed to be a P-bit word. Collectively: N1
u[x[k] : i] a hrx[k r : i];
x[s : i] H [0, 1]
(13-73)
r0
The convolution sum, defined by Equation (13-72), then becomes M1
y[k] u(x[k : 0]) a 2iu(x[k : i])
(13-74)
i1
and consists of a collection of LUT calls, a 2i scaling, and an accumulation, as shown in Figure 13-39. Note that [x[k] : i] is a vector of binary values which is presented to the table as a memory address vector. Initially, the address vector is populated by all the bits found in the common least significant-bit (LSB) location of x[k]. Each iteration, thereafter, moves the address vector [x[k] : i] to the next significant-bit location. The first (M 1) lookups produce (x[k : i]), which have positive weights. It is important to note that the algebraic weight associated with the lookup (x[k : i 1]) is twice that of (x[k : i]). This explains the scaling factor 2i found in Equation (13-74) which implements the scaling process with a dedicated 2’s-complement shift-adder, as shown in Figure 13-39. The last lookup, (x[k : 0]), has a negative weight (that is, sign bit location) which is controlled by the accumulator’s add/subtract select. In some instances, the real-time bandwidth of a DA FIR can be significantly higher than that of a filter implemented with a general-purpose multiplier. Suppose M 16-bits and an order N 12 FIR is implemented using a DSP p and a DA filter. The DSP p is assumed to have a 100 ns MAC-cycle time and the distributed filter, based on a 212 16-bit memory table, has a lookup cycle time of 10 ns. A filter cycle for a DSP p implementation would be on the order of TFIR_cycle N ? TMAC_cycle (13-75)
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FIGURE 13-39
563
A distributed arithmetic architecture.
This results in a 1,200 ns filter cycle time, or a real-time rate of 833 kHz. A DA filter would execute the same filter with a cycle time of TFIR_cycle M ? TMemory_cycle
(13-76)
This results in a filter cycle time of 160 ns, or a real-time rate of 6.250 MHz (a 750-percent improvement). This is accomplished without any appreciable increase in hardware complexity and is, in many cases, actually less complex than a design based on DSP p. It is because of the compactness of a DA solution, and its LUT dependency, that this class of filter is popular with FPGA-based designs. A distributed arithmetic design example is presented below. Example 13-22 Distributed arithmetic FIR Required:
Implement the simple 4th-order FIR given by H(z) 1.0 0.9z1 0.64z2 0.575z3 as a distributed arithmetic FIR. Results:
The worst case gain of the FIR is Gmax Z1.0 Z Z0.9 Z Z0.64 Z Z0.575Z 3.115 22. This gain requires that at least an additional two bits be assigned to the accumulator to manage the output integer field’s dynamic range growth. The largest table lookup value is [x[k] : i]max 1.64 21 (see Table 13-6) and means that the LUT data format must contain at least one integer bit. Assume that the input samples are coded as signed four-bit 2’s complement words with three fractional bits of precision. Finally, assume that the lookup memory table stores data as an eight-bit word that consists of a sign bit, one integer bit (as previously argued), and six fractional bits. The 24 16 eight-bit LUT values are pre-computed, as summarized in Table 13-6. Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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TABLE 13-6 DA Table Contents x[k 0:i] x[k 1:i] x[k 2:i] x[k 3:i] LUT value 0 0 0 0 0 0 0 0
0 0 0 0 1 1 1 1
0 0 1 1 0 0 1 1
0 1 0 1 0 1 0 1
0 0.5781 0.6092 0.0468 0.9062 1.4843 0.2656 0.8437
x[k 0:i] x[k 1:i] x[k–2:i] x[k 3:i] LUT value 1 1 1 1 1 1 1 1
0 0 0 0 1 1 1 1
0 0 1 1 0 0 1 1
0 1 0 1 0 1 0 1
0.9843 0.4062 1.6093 1.0468 0.0781 0.4843 0.7187 0.1406
Assume that the first four four-bit 2’s complement input sample values are x[3] 0 4 [0000] 0, x[2] 1 4 [1000] 1, x[1] 0 4 [0000] 0, and x[0] 1 ([0111] 7/8, where denotes the binary point location. The real valued output is given by y[3] h0x[3] h1x[2] h2x[1] h3x[0] h1x[2] h3x[0] 0.425. The DA filter executes the sequence of operations shown in Table 13-7. At the conclusion of the DA filter cycle, the accumulator holds the value 0.40036, which is close to the desired result. The DA error, which is –0.0246, is generally smaller than if obtained using a general-purpose ALU. High-order designs are those whose order exceeds the address space of a single lookup table. Higher-order DA filters can be constructed from lower-order distributed filters using the tree architecture, as suggested in Figure 13-40. In such cases, an FIR of an order N is spread across L tables having an address space of n-bits each. In particular, L Ts) s)
(14-14)
The bilinear z-transform is also characterized by a non-linear mapping between analog and digital frequencies. The non-linear frequency distortion is referred to as warping and is defined by (see Figure 12-11) 2 ¢ ≤ tan ¢ ≤ Ts 2
or 2 tan 1 ¢
Ts ≤ 2
(14-15)
where is the analog frequency and H [p, p) is the normalized digital frequency in radians per second (r/s). The bilinear z-transform filter design paradigm is not a straightforward process due to the fact that it involves the use of nonlinear frequency mapping rules. A step-by-step design strategy is outlined next and illustrated in Figure 14-6: 1. Specify the desired digital filter frequency domain requirements and attributes. Prewarp the digital critical digital frequencies (Equation 14-15) into corresponding critical analog frequencies . 2. From the prewarped analog frequencies , and passband and stopband gain specifications, determine the required order of the analog prototype filter Hp(s). 3. Using frequency-frequency transforms (Table 14-1), convert the analog prototype filter Hp(s) into an analog filter H(s) having the desired prewarped analog frequencies . 4. Convert the pre-warped analog filter H(s) into a digital filter H(z) using a bilinear z-transform (Equation 14-14) which automatically warps the prewarped frequencies back to their original values . The next example investigates the computation of an IIR filter order.
FIGURE 14-6
The IIR design paradigm based on the bilinear z-transform.
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Example 14-3 IIR Order Determination Required:
The determination of the analog filter order is required to complete a bilinear z-transform design process. The order estimation, required in Step 2 of Figure 14-6 can be automated using a set of pre-defined MATLAB functions buttord, cheb1ord, cheb2ord, and ellipord. Using these functions, determine the required order of the classic low-pass IIRs if sampled at 1000 Hz, having a maximum 3-dB fall-off or ripple in a passband ranging over 0 to 40 Hz, and at least 60 dB of attenuation in the stopband ranging from 150 Hz to the Nyquist frequency 500 Hz. Results:
The filter orders can be computed as follows: Wp = 40/500; Ws = 150/500; [n,Wn] = buttord(Wp,Ws,3,60) n = 5 {order} [n,Wn] = cheb1ord(Wp,Ws,3,60) n = 4 {order} [n,Wn] = cheb2ord(Wp,Ws,3,60) n = 4 {order} [n,Wn] = ellipord(Wp,Ws,3,60) n = 4 {order} The next example illustrates the step-by-step bilinear z-transform design process. Example 14-4 Bilinear z-Transform Filter Required:
Synthesize a digital Butterworth filter using the bilinear z-transform that meets or exceeds the following specifications: • • • • •
Maximum band attenuation 3 dB Passband f H [0, 1] kHz Minimum stopband attenuation 10 dB Stopband f H [2, 5] kHz Sample frequency fs 10 kHz
Results:
The step-by-step procedure consists of the following set of actions: Step 1 requires that the digital filter frequencies ( fp 1 kHz, fa 2 kHz, and fs 10 kHz) be prewarped to their analog counterparts. The prewarped analog passband and stopband critical frequencies are
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p 2p fp/fs 2p (0.1) 0.2p p
2 tan(p/2) 20 103 tan(0.1p) 6498 r/s → 1.0345 kHz Ts
{passband}
a 2p fa/fs 2p (0.2) 0.4p a
2 tan(a/2) 20 103 tan(0.2 p) 14531 r/s → 2.312 kHz Ts
{stopband}
Step 2 requires that an analog prototype filter Hp(s) be constructed. From the given and derived data, the need for a 2nd-order 3-dB Butterworth prototype filter model can be established. The filter has a passband cutoff frequency of 1, a normalized transition bandwidth ratio of kd p/a 6498/14531 0.447, and a stopband gain bounded by 10 dB. The required 2nd-order analog prototype filter is given by Hp(s)
1 s 2 1.414s 1
Step 3: The prototype is converted into a prewarped analog filter H(s) using a frequency-frequency transform. In this case, Hp(s) is mapped into a final analog filter using a low-pass to low-pass frequency-frequency transform s s/p. The resulting analog filter becomes Ha(s)
4.3 107 s 9.2 103s 4.3 107 2
Step 4: The final step is to apply the bilinear z-transform to H(s) to form H(z). This process warps the critical prewarped frequencies of Ha( j), namely p and a, into the desired digital-critical frequencies p and a, resulting in H(z)
0.0676(z 1)2 z 2 1.142z 0.412
The next example reports a Butterworth, Chebyshev I and II, and elliptic IIR design outcome using the bilinear z-transform.
Example 14-5 Classic Bilinear z-Transform Filter Required:
Synthesize a lowpass Butterworth, Chebyshev I and II, and elliptic IIR filter that meets or exceeds the following specifications using the bilinear z-transform. The digital filter design specifications are • • • • •
Maximum passband attenuation 1.0 dB Minimum stopband attenuation 40.0 dB Sampling frequency 10000.0 Hz Passband edge 1500.0 Hz Stopband edge 2500.0 Hz
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Results:
Following the four-step process shown in Figure 14-6, the following outcomes result. Butterworth, order n 8; actual stopband attenuation 40.9855 dB Digital Filter Scale Factor k 0.0005705414218556547 Numerator Coefficients Denominator Coefficients b 0: 1.000000000000000 a 0: 1.000000000000000 b 1: 8.000000000000000 a 1: 2.829054555430326 b 2: 28.00000000000000 a 2: 4.309045376441891 b 3: 56.00000000000000 a 3: 4.092118976022213 b 4: 70.00000000000000 a 4: 2.619609039717636 b 5: 56.00000000000000 a 5: 1.132089946694619 b 6: 28.00000000000000 a 6: 0.3203684065766790 b 7: 8.000000000000000 a 7: 0.05378515271965319 b 8: 1.000000000000000 a 8: 0.004084412125652116 Chebyshev I, order n 5; actual stopband attenuation 44.35666 dB Digital Filter Scale Factor k 0.002020169397617657 Numerator Coefficients Denominator Coefficients b 0: 1.000000000000000 a 0: 1.000000000000000 b 1: 5.000000000000000 a 1: 3.162364647736195 b 2: 10.00000000000000 a 2: 4.760700364549023 b 3: 10.00000000000000 a 3: 4.052794082948058 b 4: 5.000000000000000 a 4: 1.934390525887203 b 5: 1.000000000000000 a 5: 0.4152867390282085 Chebyshev II, order n 5; actual stopband attenuation 44.3566 dB Digital Filter Scale Factor k 0.05239987594174734 Numerator Coefficients Denominator Coefficients b 0: 1.000000000000000 a 0: 1.000000000000000 b 1: 2.073170731707318 a 1: 1.205636106513167 b 2: 3.170731707317074 a 2: 1.213622639361258 b 3: 3.170731707317074 a 3: 0.4983685124449977 b 4: 2.073170731707318 a 4: 0.1583280351022219 b 5: 1.000000000000000 a 5: 0.01358662911081143 Elliptic, order n 4; actual stopband attenuation 51.1447 dB Digital Filter Scale Factor k 0.02099872314742810 Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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Numerator Coefficients b 0: 1.000000000000000 b 1: 1.567841933416378 b 2: 2.196319333663452 b 3: 1.567841933416378 b 4: 1.000000000000000
587
Denominator Coefficients a 0: 1.000000000000000 a 1: –2.346138658587813 a 2: 2.690894615786962 a 3: –1.585086766991654 a 4: 0.4130798064394767
The frequency domain behavior of each IIR filter is shown in Figure 14-7. It can be seen that in all cases the synthesized IIR, using the bilinear z-transform, is in close agreement with the magnitude frequency domain specifications. Notice that there is a non-linear frequency-dependent group delay ranging from near 0 to 16 sample delays. Furthermore, the most egregious phase or group delay differences are found in the filter’s transition band. This non-linear phase distortion is, in general, difficult to correct with an all-pass phase-compensating filter. As a general rule-of-thumb, the non-linear group-delay equalization of an Nth-order IIR would require another IIR of an order of at least 2N.
FIGURE 14-7 The IIR performance for the four classic filters in terms of magnitude frequency (top), and group delay (bottom) responses. (The frequency was normalized with respect to fs /2.)
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The following example performs a side-by-side time-domain comparison of an IIR designed using an impulse invariant transform and the bilinear z-transform. Example 14-6 Impulse Invariant vs. Bilinear IIR Required:
A system having a ramp impulse response h(t) tu(t) can be periodically sampled at a rate fs 1 Hz and then transformed into a digital filter using the standard and bilinear z-transform. While the system is unstable, it can nevertheless be used to explore the difference between the two design paradigms. Results:
The impulse-invariant model H(z) is defined in terms of the standard z-transform of H(s) 1/s2. The standard and bilinear z-transform of H(s) is, in either case, a straightforward mapping process. H1(z)Z standardz
z z 1 z 2z 1 1 2z 1 z 2 2
H2(z)Z bilinearz 0.25
z 2 2z 1 1 2z 1 z 2 0.25 z 2 2z 1 1 2z 1 z 2
The short-term impulse responses can be computed using long division. Specifically: 1z 1 2z 2 3z 3 ramp time series Standard z-transform: z
2
2z
1
1qz z 2 2z 1 1 continue 2
or h1[k] {0, 1, 2, 3, . . .}, which is recognized to be the sample values of the ramp, thereby reinforcing the impulse invariant claim of the standard z-transform. Next, consider Bilinear z-transform: 1 2z
1
0.25 1z 1 2z 2 others z q 0.25 0.5z 1 0.25z 2 0.25 0.5z 1 0.25z 2 continue 2
or h2[k] {0.25, 1, 2, . . .}, which is not a ramp function. That is, the bilinear z-transform produces an impulse response which does not agree with the value of h(t) at the sample instances and, as a result, is not an impulse-invariant mapping.
14.6 MATLAB CLASSIC IIR SUPPORT At present, the primary sources of MATLAB IIR design software support are • SPT Signal Processing Toolbox • FT Filter Design Toolbox • FT2 Filter Design Toolbox 2 The basic software SPT options are listed in Table 14-4. Details regarding their functionality and syntax and theory of operation can be found online. Traditional FIR modules, appearing in the SPT, are shown in Figure 14-8 and Table 14-5. Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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TABLE 14-4 MATLAB IIR Support Function
Source
Description
Example
butter cheby1 cheby2 ellip buttord
SPT SPT SPT SPT SPT
Figure 14-8a Figure 14-8b Figure 14-8c Figure 14-8d
cheb1ord cheb2ord ellipord maxflat yulewalk bilinear
SPT SPT SPT SPT SPT SPT
impinvar
SPT
Design a Butterworth analog and digital filter. Design a Chebyshev Type-I filter (passband ripple). Design a Chebyshev Type-II filter (stopband ripple). Design an elliptic (Cauer) filter. Calculate the order and cutoff frequency for a Butterworth filter. Calculate the order for a Chebyshev Type-I filter Calculate the order for a Chebyshev Type-II filter. Calculate the minimum order for elliptic filters. Design a generalized digital Butterworth filter. Design a recursive digital filter. Bilinear transformation method for analog-to-digital filter conversion. Impulse-invariance method for analog-to-digital filter conversion.
TABLE 14-5 Classic IIR Signal Processing Toolbox Support Function: butter Example: Design a 9th-order high-pass Butterworth filter with a cutoff frequency of 300 Hz, where fs = 1000 Hz ( fs /2 = 500). MATLAB: [b,a] = butter (9,300/500,‘high’);
Function: cheby1
FIGURE 14-8a
Example: Design a 9th-order low-pass Chebyshev Type-I filter with 0.5 dB of ripple in the passband, a cutoff frequency of 300 Hz, and where fs 1000 Hz ( fs /2 500). MATLAB: [b,a] = cheby1 (9,0.5,300/500);
FIGURE 14-8b (Continued) Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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TABLE 14-5 Classic IIR Signal Processing Toolbox Support (Continued) Function: cheby2 Example: Design a 9th-order low-pass Chebyshev Type-II filter with stopband attenuation 20-dB down from the passband, with a cutoff frequency of 300 Hz, and where fs 1000 Hz ( fs /2 500). MATLAB: [b,a] = cheby2 (9,20,300/500);
Figure 14-8c Function: ellip Example: Design a 9th-order low-pass elliptic filter with a cutoff frequency of 300 Hz, where fs 1000 Hz ( fs/2 500), with 3 dB of ripple in the passband, and 50 dB of attenuation in the stopband. MATLAB: [b,a] = ellip (6,3,50,300/500);
Figure 14-8d
14.7 OTHER IIR MODELS The characteristics of an IIR can sometimes be deduced from measured system inputoutput behavior. The challenge is to mathematically translate these measurements into a filter model. An important filter modeling process is based on interpreting a system’s inputoutput power spectrum in the context of an IIR filter model. This leads to a class of filter modeling strategies that are often called parametric spectral estimators. Parametric estimators produce a transfer function for a linear system that most likely produces the observed power spectra in some acceptable mathematical manner. While the details of the science of spectral estimation is elegant and important in a number of application areas, for purposes of filter design it is simply viewed as a transfer function production tool. There are basically three parametric estimation schemes in common use. They are called the auto-regressive (AR), moving-average (MA), and auto-regressive movingaverage (ARMA) methods. An nth-order auto-regressive model, denoted, AR[n], is given by Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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H(z)
1 1 a[1]z 1 c a[n]z n
An mth-order moving-average model, denoted MA[m], is given by H(z) b[0] b[1]z 1 c b[m]z m
591
(14-16)
(14-17)
An n, m order auto-regressive moving-average model, denoted ARMA[m, n], is given by: b[0] b[1]z 1 c b[m]z m (14-18) H(z) 1 a[1]z 1 c a[n]z n The quality of the estimates are case-dependent and exhibit differing spectral responses consisting of spectral peaks and valleys depending upon which modeling technique is employed. Supporting these model-building activities are a number of basic MATLAB objects that are motivated in the following example. Example 14-7 Parametric IIR Filters Required:
Design and compare the collection of MATLAB-enabled AR modeling techniques using a common test signal. Specifically, conduct a study of the following AR objectives: • • • •
Burg Method: MATLAB’s burg function Covariance Method: MATLAB’s pcov function Modified Covariance Method: MATLAB’s pmcov function Yule-Walker Method: MATLAB’s pyulear function
Results:
Define an AR signal generator using the AR model: H(z)
1 z 4 2.2137z 3 2.9403z 2 2.1697z 1 0.9606
If the input is a white random noise process, then the output x[k] is called a random AR sequence. The spectral shape of the output response, X(e j), is shown in Figure 14-9.
FIGURE 14-9 The spectral power density of a test signal. (The frequencies were normalized with respect to fs/2.)
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FIGURE 14-10 Parametric estimation performance: Burg (upper left), Covariance (upper right), Modified Covariance (lower left), and Yule Walker (lower right). (The frequencies were normalized with respect to fs /2.)
Burg AR Model: pburg(x, 4) designs a 4th-order Burg AR model based on the test signal x[k]. Covarariance AR Model: pcov(x, 4) designs a 4th-order Covariance AR model based on the test signal x[k]. Modified Covariance Model: pmcov(x, 4) designs a 4th-order Modified Covariance AR model based on the test signal x[k]. Yule-Walker AR Model: pyulear(x, 4) designs a 4th-order Yule Walker AR model based on the test signal x[k]. The outcomes are reported in Figure 14-10. Notice that the results are able to successfully identify the stronger of the two peaks shown in Figure 14-9 and, to a lesser degree, the weaker peak. The quality of the estimate would degrade, however, if the spectral peaks become increasingly close or measurement noise becomes a factor.
14.8 COMPARISON OF FIR AND IIR FILTERS The principal attributes of FIR are its simplicity and phase linearity. The strength of the IIR is its ability to achieve frequency selective filtering with a low-order non-linear phase design. The difference between the order of an FIR and IIR that’s needed to meet a magnitude
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frequency response objective can be significant. This difference can be equated to differing complexity, which defines the maximum speed, cost, and power consumption of the final design. The following example compares FIRs to IIRs. Example 14-8 IIR/FIR Comparison Required:
Compare the estimated order of a low-pass equiripple FIR and elliptic IIR filter having a 0.0873-dB passband, 80-dB stopband, an fs equal to 8000 Hz, a passband range of f H [0, 480] Hz, and a stopband range of f H [520, 4000] Hz. Result:
The FIR design parameters are given by: d1 0.99 or (1 – d1) 102 d2 104 f 40/8000 0.005 Based on Equation (13-35), an FIR of order nFIR
10 log(106) 15 1 644 14(0.005)
would be required to meet the design objectives. Further analysis will reveal that a 12thorder elliptic IIR will satisfy the design statement. If these filters are compared on the basis of the number of multiplications required to mechanize a filter, the nth-order FIR requires nFIR multiplies per filter cycle. The nth-order elliptic filter could require up to nIIR = 2n 1 multiplies per filter cycle. This results in a complexity ratio of r 644/25 ~ 26. If multiplication is the design’s principal temporal bottleneck, then the IIR could run up to 26 times faster than the FIR.
14.9 STATE VARIABLE FILTER MODEL Classic and parametric IIR design strategies result in transfer function H(z). A transfer function, however, only quantifies the filter’s input-output filter behavior and does not describe the filter’s internal workings. The internal structure of the filter is defined by the system’s architecture. What is needed to completely quantify the runtime behavior of an IIR is a filter representation methodology that accurately reflects the details of the filter’s architecture. This is the role of state variables. State variables and the attendant state variable model audit the information entering, exiting, and residing within a digital filter. This information can be monitored by observing the condition, or state, of the filter’s registers. This is the role of a state space filter model. A state variable model of a single-input singleoutput nth-order IIR, illustrated in Figure 14-11, is given by State model: x[k 1] Ax[k] bu[k] Output model: y[k] cTx[k] du[k]
(14-19)
where x[k] is an n-dimension state vector of state variables, u[k] is the input, and y[k] is the output. The other elements of the state variable model are an n n feedback matrix A,
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FIGURE 14-11
A state variable IIR filter model.
1 n input vector b, n 1 output vector c, and scalar direct input-output path gain d. The next example interprets an IIR as a state variable model. Example 14-9 State Simulation Required:
A 2nd-order system is given by the state space model: A B
0 0.11
1 R; 1
0 b B R; 1
c B
0.11 R; 0
d [1]
Sketch the architecture defined by the state model and simulate the system’s response to an input u[k] d[k] d[k 1] 0.11d[k 2]. Result:
The state model is graphically interpreted in Figure 14-12. The response of the system to u[k] is reported next on a sample-by-sample basis for each state. The sample index k corresponds to the time prior to the clock being incremented, and k the instant the clock is incremented.
k
u[k]
0
1
0 1
3
x1[k1]
0
1
0
0
0
1 1 0 1 0.11 0.11 0
0 0
0
011
1
0.11 0 0.11 0
y[k]
0
1
0.11
x1[k]
0
1100
2 3
x2[k]
1001
1 2
x2[k1]
0 0
0
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FIGURE 14-12
A second-order system architecture.
A state-determined system is defined by the state four-tuple [A, b, c, d], which characterize all the feedback and feedforward paths found within a filter. The state fourtuple [A, b, c, d] is also known to be related to the input-output transfer function using the formula H(z) cT(zI A)1b d
(14-20)
The next examples illustrates the conversion of a state variable model into a transfer function using Equation (14-20). Example 14-10 State to Transfer Function Conversion Required:
Suppose an IIR is represented by the state four-tuple [A, b, c, d ], where A B
0 1
1 0 1 R; b B R; c B R ; d 1 1 1 1
What is the transfer function H(z) of the corresponding IIR? Result:
The transfer function associated with the state model is given by H(z) cT(zI A)1b d
1 [1 z2 z 1
1] B
z1 1
1 0 RB R 1 z 1
z2 z1 1 2 . z2 z 1 z z1
The mapping from the state four-tuple [A, b, c, d] to H(z) given by Equation (14-20) is unique. However, the mapping from H(z) to a state four-tuple [A, b, c, d] is not unique. This explains why there are a number of architectural representations for a common filter transfer function.
14.10 ARCHITECTURE Initially, an IIR is expressed as a transfer function H(z). The transfer function H(z) can be factored and partitioned in many ways, each resulting in a different architectural expression. A common representation for a transfer function H(z) is as the ratio of
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rational polynomials, namely M
H(z)
N(z) k D(z)
m a bmz
m0
(14-21)
N
a0 a amz m m1
The transfer function is said to be monic if a0 1.0. The roots of the polynomial N(z) found in Equation (14-21) defines the location of the filter’s zeros to be zi, i H [1, M]. The roots of the polynomial D(z) define the location of the filter’s poles to be li, i H [1, N]1. Collectively, the filter’s poles and zeros satisfy N1
N1
N(z) q (z zi);
D(z) q (z li)
i0
i0
(14-22)
This gives rise to an alternative factorization of H(z) as a product form of low-order polynomials of the form N1
q (z zi) N(z) i0 H(z) K N1 D(z) q (z li)
(14-23)
i0
Furthermore, the poles and zeros can be grouped together to create a collection of loworder subfilters Hi(z) that can be chained together to form Q
H(z) K q Hi(z)
(14-24)
i1
where Q N. The list of possibilities is virtually endless. There are, however, sets of preferred architectures that have evolved over time which have a proven utility. They represent various trade-offs between maximum real-time speed, complexity, and precision.
14.11 DIRECT II ARCHITECTURE The Direct II architecture is a common IIR form. It’s based on a specific interpretation of Equation (14-21) which expresses an Nth-order IIR, having a transfer function H(z), where H(z)
b0 b1z 1 c bNz N N(z) D(z) a0 a1z 1 c aNz N
(b1 b0a1/a0)z 1 c (bN b0aN /a0)z N b0 a 0 a0 a1z 1 c aNz N c1z 1 c cNz N b0 1 a d0 C(z)¢ ≤. D(z) 0 a0 a1z 1 c aNz N
(14-25)
1
For purposes of notational convenience, poles will temporarily be denoted li instead of pi as is the common case.
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and the accompanying state assignment rule x[k N] x1[k] x2[k] x[k N 1] TD T x[k] D ( ( xN[k] x[k]
(14-26)
where x[k] is the N-dimension state vector. From the state assignment, the next state value, namely x[k 1], can be computed to be x1[k 1] x [k 1] T x[k 1] D 2 ( xN[k 1] x2[k] x3[k] D T ( aN x1[k] aN1x2[k] c a2xN1[k] a1xN[k] u[k]
(14-27)
which results in both the state and the output equation x[k 1] Ax[k] bu[k] y[k] cTx[k] d0u[k]
(14-28)
where the Direct II state four-tuple [A, b, c, d] is given by 0 1 0 0 0 1 AE ( ( ( 0 0 0 aN aN1 aN2
c c f c c
0 0 ( U 1 a1
(14-29)
0 cT (cN bN b0aN cN1 bN1 b0aN1 c c1 b1 b0a1) ( bD T; 0 d0 b0 1 The (i, j) element of A defines the path gain between state xj[k] and xi[k 1], bi is the path gain between input and xi[k 1], ci is the path gain between xi[k] and the output, and d0 is the gain of the direct input-output path. These relationships are summarized in Figure 14-13. The next example illustrates how a transfer function can be converted into a Direct II state variable filter model.
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FIGURE 14-13
A Direct II filter architecture.
Example 14-11 Transfer Function to Direct II Conversion Required:
Consider a 3rd-order digital filter having a transfer function given by H(z)
z 3 0.5z 2 0.315z 0.185 . z 3 0.5z 2 0.5z 0.25
Produce the Direct II state four-tuple, S (A, b, c, d), and interpret the results. Result:
The transfer function can be directly converted into a Direct II state model in accordance with Equation (14-25). In particular, Equation (14-25) states that H(z)
1 0.5z 1 0.315z 2 0.185z 3 1 0.5z 1 0.5z 2 0.25z 3
1
0.815z 2 0.065z 3 1 0.5z 1 0.5z 2 0.25z 3
The production of the state four-tuple, S [A, b, c, d], follows and is given by 0 A£ 0 0.25
1 0 0.5
0 0 0.065 1 ≥; b £0≥; c £0.815≥; d 1. 0.5 1 0.0
which is graphically interpreted in Figure 14-14. Notice that the matrix coefficient a31 defines the path gain between x1[k] and x3[k 1]—that is, a31 a3 0.25.
14.12 MATLAB DIRECT II ARCHITECTURE Caveat: MATLAB state variable programs make state assignments in a reverse order to that generally found in signal processing literature and textbooks (such as Equation 14-26). Specifically, the usual state xi appears as state xNi in MATLAB.
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FIGURE 14-14
599
A Direct II filter architecture.
The conversion of a transfer function H(z) into a Direct II architecture can be performed using the MATLAB programs TF2SS or ZP2SS. Function TF2SS converts a transfer function H(z) N(z)/D(z) into a Direct-II state form using the syntax [A, B, C, D] TF2SS(NUM,DEN). Function ZP2SS converts a transfer function H(z), having zeros (Z), poles (P), and input scale factor K into a Direct II state form using the syntax [A, B, C, D] ZP2SS(Z, P, K). It should be noted that the state assignments are in reverse order to those shown in Figure 14-14. The conversion between the common 3rd-order Direct II indexing scheme used in Figure 14-14, and MATLAB is shown next. Normal
MATLAB
x1[k] x2[k] x3[k]
x3[k] x2[k] x1[k]
The next example illustrates the conversion of a transfer function to a Direct II state variable model using MATLAB. Example 14-12 Matlab Transfer Function to Direct II Conversion Required:
Consider again Example 14-11 defined in terms of a 3rd-order digital filter: H(z)
z 3 0.5z 2 0.315z 0.185 . z 3 0.5z 2 0.5z 0.25
Produce the state four-tuple, S [A, b, c, d] and interpret the results using MATLAB. Result:
The production of the state four-tuple, S (A, b, c, d ), using MATLAB proceeds as follows: n = [1 -.5 -.315 -.0185]; d = [1 -.5 .5 -.25]; [A,B,C,D] = TF2SS(n,d)
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FIGURE 14-15
A Direct II filter architecture using MATLAB.
A = 0.5000 1.0000 0
-0.5000 0 1.0000
0.2500 0 0
{x3 in Figure 14-15} {x2 in Figure 14-15} {x1 in Figure 14-15}
B = 1 0 0
{b3 in Figure 14-15}
C = 0
-0.8150
0.0650
{c3, c2, c1 Figure 14-15}
D = 1 and is graphically interpreted in Figure 14-15. It can be seen that the system described in Figure 14-15 is equivalent to that shown in Figure 14-14 except for a different state indexing assignment.
14.13 CASCADE ARCHITECTURE One of the most popular IIR architectures found in common use today is called the cascade architecture. The basic cascade architecture, shown in Figure 14-16, is used to implement a transfer function of the form: Q
H(z) K q Hi(z)
(14-30)
i1
FIGURE 14-16
A cascade filter architecture.
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The ith subsystem, denoted Hi(z), is either a 1st- or 2nd-order filter having real coefficients. Each subfilter can be represented in terms of a state model Si [Ai, bi, ci, di] of order Ni, where Ni H {1, 2}, where Q
Q
a order(Hi(z)) a Ni N i1
(14-31)
i1
A cascade architecture links the ith subfilter Si [Ai, bi, ci, di] with i 1st subfilter Si1 [Ai1, bi1, ci1, di1]. Specifically, the output of subsystem Si, namely yi[k], is sent to the input of subsystem Si1, namely wi1[k]. Furthermore, each 1st- or 2nd-order subfilter defined in terms of real coefficients is derived from the poles (li) and zeros (zi) of H(z) N(z)/D(z). In particular, 1st-order subfilters are defined in terms of real poles and zeros of H(z). A 2nd-order subfilter is defined by combining a complex pole/zero with their complex conjugate counterparts resulting in a filter section having only real coefficients. The basic first and second order sections can be defined in terms of biquadratic (biquad) or Direct II structures. If lI is a real pole of H(z), then the ith first-order subsystem Hi(z) is assumed to satisfy one of the two following forms Hi(z)
qi0 qi1z 1 1 liz 1
Hi(z) qi0
(biquad)
riz 1 1 liz 1
(14-32)
; ri qi1 liqi0 (Direct II)
(14-33)
Both architectures are interpreted in Figure 14-17. The principal difference being that the Direct II possesses a state variable model, while the biquad does not. If li appears in its complex form, then it is combined with its complex conjugate pair l*i to create a 2nd-order section of the form Hi(z) di0
ni(z) 1 liz
1
n*i (z) 1 l*i z 1
(14-34)
Equation (14-34) can be realized in two forms. The first is as a 2nd-order biquad section given by Hi(z)
wi0 wi1z 1 wi2z 2 1 pi1z 1 pi2z 2
(14-35)
The second is a Direct II section given by Hi(z) di0
ri1z 1 ri2z 2 1 pi1z 1 pi2z 2
(14-36)
where the coefficients are real and are given by (z li)(z l*i ) z 2 pi1z pi2; di0 wio; ri1 wi1 pi1wi0;
ri2 wi2 pi2wi0 (14-37)
Both architectures are compared in Figure 14-17. The principal difference is again that the Direct II possesses a state variable model, the biquad does not. Because of this, Direct II implementations have been increasingly gaining favor. As a general rule, zeros are paired with the closest poles. This proximity pairing strategy will generally result in filter design which distributes the subfilter gains uniformly across all
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Biquad (top) and Direct II (bottom) 1st- (left) and 2nd- (right) order subfilter sections.
filter sections. This is considered desirable. Other pairing strategies can result in a few subsystems having excessively large dynamic range requirements while others have small gains. This creates a precision allocation problem that can compromise overall system performance.
14-14 THE MATLAB CASCADE ARCHITECTURE MATLAB contains a collection of programs that relate to cascade filter implementation. Function tf2sos converts a digital filter transfer function data to a set of second-order sections having the form b01 b02 sos D c b0L
b11 b12 c b1L
b21 b22 c b2L
1 1 c 1
a11 a12 c a1L
a21 a22 T c a2L
where the ith row of the array sos specifies the coefficients of the ith subfilter Hi(z)
b0i b1iz 1 b2iz 2 Bi(z) Ai(z) a0i a1iz 1 a2iz 2
Program zp2sos converts a transfer function H(z), specified in terms of zero-pole-gain parameters, into an L 6 sos array. Program sos2ss maps second-order filter sections into a Direct II state space form, while program sos2tf converts a collection of 2nd-order filter
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sections into a transfer function. For instances where the filter sections are 1st-order, coefficients b2i and a2i are set to zero. Program sos2zp converts 2nd-order filter sections into a zero-pole-gain form. The next example converts a transfer function into a Direct II IIR. Example 14-13 Matlab Cascade Transformations Required:
Consider a transfer function H(z) = kH1(z)H2(z), where H(z) H2(z)
2 z 1 2z 2 4z 3 z 4 ; 1 10z 1 0z 2 10z 3 z 4 1 z 1 z 2 ; 1 z 2
H1(z)
1 1.5z 1 0.5z 2 ; 1 10z 1 z 2
k 2
Given H1(z) and H2(z), compute the Direct II state-space representation of each cascaded filter section. In addition, compute the pole-zero distribution of H(z). Result:
The two cascade filters H1(z) (1 1.5z 1 0.5z 2)/(1 10z 1 z 2) and H2(z) (1 z1 z2)/(1 z2) have a MATLAB representation sos [1 1.5 0.5 1 10 1; 1 1 1 1 0 1]; {H1(z), H2(z)}. The sos array can also be machine generated given the original transfer function as shown below: n=[-2 1 2 4 1]; d=[1 10 0 -10 -1]; [sos,g]=tf2sos(n,d) sos = 1.0000 -1.5000 -0.5000 1.0000 10.0000 1.0000 1.0000 1.0000 1.0000 1.0000 0.0000 -1.0000 g = -2 From the sos database, the cascaded filter sections can be implemented as Direct II filters as follows: sos1=sos(1,:); [A,B,C,D]=sos2ss(sos1) A = -10.0000 -1.0000 1.0000 0 B = 1 0 C = -11.5000 -1.5000 D = 1
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sos2=sos(2,:); [A,B,C,D]=sos2ss(sos2) A = -0.0000 1.0000 1.0000 0 B = 1 0 C = 1.0000 2.0000 D = 1 Finally, using sos2pz, the filter’s pole-zero distribution can be determined as follows: [z,p,k] = sos2zp(sos) z = -0.5000 + 0.8660i -0.5000 - 0.8660i 1.7808 -0.2808 p = -1.0000 1.0000 -9.8990 -0.1010 k = -2 {k=d} which are the four zeros and four poles of H(z).
14.15 PARALLEL ARCHITECTURE A parallel IIR architecture is shown in Figure 14-18, and implements the transfer function Q
H(z) K ¢ d0 a Hi(z)≤
(14-38)
i1
where Hi(z) is a 1st- or 2nd-order subsystem defined with respect to real coefficients. Each subsystem is represented by a state-determined model, Si [Ai, bi, ci, di], where Q
Q
a order(Hi(z)) a Ni N i1
(14-39)
i1
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FIGURE 14-18
A parallel architecture.
A parallel architecture, as the name implies, consists of Q subfilters operating in parallel with their outputs sent to a common adder. Specifically, a possibly scaled common input is presented concurrently to all subfilters Si [Ai, bi, ci, di], producing independent individual output responses yi[k] which are then combined (added) to form y[k]. The state variable model for a parallel system is given by S [A, b, c, d], where A1 0 A •0 ( 0
0 A2 0 ( 0
0 0 A3 ( 0
c c c f c
0 b1 0 b 0 µ: b § 2 ¥ ; cT (c1 ( ( bQ AQ
Q
c2 c cQ) ; d a di i0
(14-40) Each subfilter Hi(z) is implemented as a 1st- or 2nd-order biquad or Direct II filter.
14.16 LATTICE / LADDER ARCHITECTURE In general, an Mth-order linear time invariant IIR can be represented as the monic transfer function M
B(z) H(z) A(z)
a biz
i
i0
(14-41)
M
1 a aiz
i
i1
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FIGURE 14-19
A lattice-ladder architecture.
The Mth-order system can be realized as the lattice-ladder IIR filter, as shown in Figure 14-19. The filter structure consists of two major subsystems, one providing feedback, the other feedforward data paths. Attached to feedback taps are a collection of tap weights li, called reflection coefficients, and are used to synthesize a unique input-output relationship. One of the known properties of a lattice IIR filter is that the reflection coefficients of a stable lattice filter are bounded by unity (for instance, k ki k 1.0). The IIR lattice filter design procedure is similar in form to that developed for a lattice FIR and is based on iteratively computing the reflection coefficients li. The derivation of the lattice-ladder parameters begins with restructuring H(z) to read M
M
i1
i1
H(z) a liGi(z) a li B i(z)/A(M)(z) M
a libiz i/A(M)(z) 5 C (M)(z)/A(M)(z); ^
A(M)(z) (z)
(14-42)
i1
where B(m)(z) was defined in an FIR lattice-ladder discussion to be the reverse copy of A(m)(z) and finally A(M)(z) A(z). Define m
m
i1
i1
(m) (m1) C (m)(z) a c(m) (z) lmB (m)(z) i (z) a liB (z) C
(14-43)
where C(m1)(z) is of the degree m 1, the degree of the monic polynomial B(m)(z) is m, where the mth coefficient of B(m)(z) is unity, and the reflection coefficient is lm c(m) m
(14-44)
The C(m)(z) equation can be rearranged to read C (m1)(z) C (m)(z) lmB (m)(z)
(14-45)
which can be used to iteratively compute the coefficients lm. The design of a lattice IIR is illustrated in the following example. Example 14-14 Lattice-Ladder Architecture Required:
Suppose H(z) B(z)/A(z) C (M)(z)/A(M)(z) (1 2z1 3z2 4z3)/(1 (21/32)z1 (21/64)z2 (1/8)z3) (see Figure 14-20). Derive the lattice-ladder filter parameters. Result:
The coefficient production process is illustrated next. Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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FIGURE 14-20
A 3rd-order lattice-ladder architecture.
C (3)(z) 1 2z1 3z2 4z3 1 k 3 c (3) 3 4 A(3)(z) 1 (21/32)z1 (21/64)z2 (1/ 8)z3 Therefore, B(3)(z) (1/8) (21/64)z1 (21/32)z2 z3 (reverse order) -----C (2)(z) C (3)(z) l3B(3)(z) (1 2z1 3z2 4z3) (4) ((1/8) (21/64)z1 (21/32)z2 z3) (1 2z1 3z2 4z3 ) ((1/2) (21/16)z1 (21/8)z2 4z3) (1/2 (11/16) z1 (3/8) z2) 1 k 2 c (2) 2 3/8; (2) A (z) 1 (5/8)z–1 (1/4)z2 Therefore, B(2)(z) (1/4) (5/8)z1 z2 (reverse order) -----C (1)(z) C (2)(z) l2B(2)(z) (1/2 (11/16) z–1 (3/8) z–2) (3/8)((1/4) (5/8)z–1 z–2) (1/2 (11/16)z1 (3/8)z2) (3/32 (15/64)z1 (1/8)z–2) (13/32 (29/64)z1) 1 k1 c (1) 1 29/64 A(1)(z) 1 (1/2)z1 Therefore, B(1)(z) (1/2) z1 (reverse order) -----C (0)(z) C (1)(z) l1B(1)(z) (13/32 (29/64)z–1) (29/64) (1/2 z1) (13/32) (29/128) 23/128 1 k0 c (0) 0 23/128 The numerator of the filter’s transfer function can be isolated and synthesized by noting that Gi(z) B(i)(z)/A(M)(z) (Equation 14-42) and that: lB(i)(z) (numerator terms)
z0
z1
z2
z3
l0B(0)(z): l0 23/128 l1B(1)(z); l1 29/64 l2B(2)(z); l2 3/8 l3B(3)(z); l3 4
liB(i)(z)
23/128 29/128 3/32 1/2 128/128 1
29/64 15/64 21/16 128/64 2
3/8 21/8 24/8 3
4 4
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The presented design technique is sometimes referred to as the Gray-Markel method. Lattice-ladder filters can be represented in a state variable form, as well as x[k 1] Ax[k] bu[k] y[k] cTx[k] du[k] k1 1 k 21 AE 0 0 c
cF
k2 k1k2 1 k 22 0 c
k3 k1k3 k2k3 1 k 23 c
k4 k1k4 k2k4 k3k4 c
l1 A 1 k 21 B l0(k1)
c 1 c k1 c U; b E k2 U c k3 c c
l2 A 1 k 22 B l1(k2k1) l0(k2)
(14-46)
l3 A 1 k 23 B l2(k3k2) l1(k3k1) l0(k3)
V;
l4 A 1 k 24 B l3(k4k3) l2(k4k2) l1(k4k1) l0(k4) c M
d l0 a (ki)li i1
14.17 MATLAB LADDER/LATTICE SUPPORT MATLAB’s latcfilt, latc2tf, and tf2latc functions have a lattice-ladder purpose. The function latcfilt, for instance, is used to filter a time-series using a lattice-ladder filter, while the function latc2tf translates a lattice-ladder filter into a transfer function. Lastly, the function tf2latc translates a transfer function into a lattice-ladder filter. The next example demonstrates the use of MATLAB in the design of a lattice IIR. Example 14-15 Lattice-Ladder Design Required:
Consider an IIR ARMA(5, 2) filter model given by H(z)
B(z) 1 0.6149z 1 0.9899z 2 0.0031z 4 0.0082z 5 A(z) 1 (1/2)z 1 (1/3)z 2
Derive the coefficients of a lattice-ladder implementation of H(z). Result:
The Signal Processing Toolbox function tf2latc accepts an IIR filter in polynomial form and returns the corresponding lattice-ladder coefficients as shown next. [k,v] = tf2latc(b,a) k = {k parameters}
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609
0.3750 0.3333 0 0 0 v =
{l parameters} 0.6252 0.1212 0.9879 -0.0009 0.0072 -0.0082
Since k ki k 1 for all reflection coefficients, the filter is stable.
14.18 NORMAL ARCHITECTURE Besides Direct II, Cascade, Parallel, and Lattice/Ladder, other architectures are found in common use. Among these are normal, section optimal, and wave architectures of which normal is the most commonly encountered. Normal filters, like many other forms, are based on 2nd-order sections having a transfer function of the form:
H(z)
z 2b0 b1z b2 z 2 a1z a2
5 d0
b0 b1z 1 b2z 1 1 a1z 1 a2z 2
g1z 1 g2z 2 1 a1z
1
a2z
2
d0
m * z 1 mz 1 1 1 pz 1 p * z 1
(14-47)
where m is a Heaviside coefficient and p is one of the poles of the system. If the poles are complex, they appear as complex conjugate pairs. The 2nd-order section, shown in Figure 14-21, is said to be a fully connected architecture in that all possible inter-state connections are established. The 2nd-order system is said to be normal if the state feedback matrix AN satisfies the condition A TNA N A NA TN where “T ” denotes the matrix transposition. The following example presents a study of a normal filter architecture. Example 14-16 Normal Matrix Required:
Show that the A matrix, illustrated next, is normal. A B
a1 a2
a2 R a1
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FIGURE 14-21
CHAPTER FOURTEEN
A fully connected architecture.
Result:
Direct computation results in AT A B B
a1 a2 a1 a2
a2 a RB 1 a1 a2 a2 a1 RB a1 a2
a2 a 2 a 22 R B 1 a1 0
0 R a 21 a 22
a2 R AAT a1
which demonstrates the normality of A. The connected system shown in Figure 14-21 can be defined in terms of a state variable four-tuple [A, b, c, d]. This system, in turn, can be mapped into another 2nd-order system architecture [AN, bN, cN, dN] using a non-singular similarity transform T. The new architecture is specified in terms AN T1AT, bN T1b,
(14-48)
cN cT T1, dN d.
This process is called a change of basis. For specific transforms T, AN can be created as a normal matrix. In fact, the original filter (say, [A, b, c, d]) can be completely arbitrary. The use of state variable transformation is demonstrated in the next example. Example 14-17 Normal Matrix Required:
Convert the state-determined system A B
a1 a2
b c 1 R ; b B 1 R; c B 1 R; 0 b2 c2
d d0
into a fully connected normal system.
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The poles of the original system satisfy det(zI A) z2 a1z a2 (z p)(z p*) where p s jv. Define the similarity transform T to be 1 0 T vB v
1 R s
Upon computing AN T1AT, bN T1b, and c TN cT T, it follows that AN T 1AT b B B
1 a1 RrB 0 a2
s v
s (s2 a1s a2)/v R B a1 s v
s v
1 Rr s
1 1 0 Rb B 0 v v v R s
which is a normal matrix, and bN and cN follow.
14.19 STABILITY The stability of an IIR linear filter can be defined in the transform domain in terms of eigenvalues or poles of the filter’s transfer function H(z) N(z)/D(z). The stability classifications based on knowledge of the location of a filter’s pole values, li are summarized in Table 14-6. A state-determined filter system can be expressed in terms of the state four-tuple [A, b, c, d]. The system poles can be extracted for the det(lI A) and interpreted in accordance with the cases exhibited in Table 14-6. A more sophisticated stability guarantor is called Lyapunov’s Stability Criterion, which states that if A is an N N matrix defining a stable Nth-order IIR, then for any N N matrix W, the matrix series `
m T m a A W(A )
(14-49)
m0
TABLE 14-6 Stability Cases Pole
Magnitude
Stability Classification
Comments
li
k li k 1
Asymptotically stable
If the poles are interior to the unit circle in the z-domain, the filter is stable for all bounded inputs.
li
k li k 1
Conditionally stable
For a pole on the unit circle at z li, the system is stable provided that the input does not also have a pole at z li.
li
k li k 1
Unstable
If a pole of multiplicity greater than one resides on the unit circle at z li, the system is unstable.
li
k li k 1
Unstable
If any of the filter poles are exterior to the unit circle in the z-domain, the filter is unstable.
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converges. In addition, there exists a unique positive semi-definite matrix K, and a positive semi-definite matrix Q, such that K AKAT bQbT
(14-50)
if and only if A is a stability matrix. As stated in the study of FIRs, stability is rarely the issue. What is important is the quantification of the filter’s dynamic range requirements. This is a more challenging question than simply determining the stability class of an IIR. The next example performs a stability analysis on a low-order IIR system. Dynamic range requirements are discussed in the next section. Example 14-18 Stability Required:
Suppose that a 1st-order (such as, N 1) filter is given by the state four-tuple [a, 1, c, d] where a is an arbitrary constant. Determine the stability classification of the filter. Result:
The eigenvalue method states that for the system to be stable, the roots to det(lI A) det(l a) 1 requires k a k 1. Now, let the positive definite matrix Q be set to Q I. If the 1 1 matrix K [k] matrix, satisfying k aka bb a2k 1 is positive semidefinite, then the filter is stable. The 1 1 matrix k can be obtained by solving k a2k 1, which results in k 1/(1 a2). The 1 1 martrix k is positive semi-definite if k 0, which requires that k a k 1. This is the same conclusion obtained using the eigenvalue method.
14.20 FINITE WORDLENGTH EFFECTS Digital filters can be studied in the context of their type (such as Butterworth), architecture (say, Cascade), and arithmetic structure. A filter will work as predicted provided the system remains linear. This is almost assured for floating-point implementations. Fixed-point systems, however, are a distinctly different case. The mechanisms by which a theoretically linear system becomes non-linear are called finite wordlength effects. The finite wordlength effects can impact a filter in the manner listed next in descending order of severity: • • • • •
Overflow saturation Arithmetic rounding Coefficient rounding Data scaling Zero-input limit cycling
Any of these error processes can compromise the performance of a digital filter to the point that the filter is no longer viable. Fortunately, corrective actions are available and can take the form of • Scaling the input or coefficients • Increasing the filter’s data wordlength • Selecting an alternative architecture or filter model
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FIGURE 14-22
613
A fixed-point filter design procedure.
This general IIR design and analysis process is suggested in Figure 14-22. It begins by specifying a filter’s transfer function or filter coefficients. The filter is then mapped into a specific architecture. Implicit in this process is a definition of an arithmetic unit which can be classified as floating point or fixed point. For cost and speed reasons, fixed point designs are often preferred to as floating-point instantiation. An N-bit fixed-point number system will be assumed to be represented by a single sign-bit, I-integer bits and F-fractional bits. This defines a [N:F] data format where N I F 1. The dynamic range of an [N:F ] system is bounded by 2I and the value of the least significant bit (LSB) is 2F. The error variance associated with rounding or truncating a real number to an [N:F] formatted word is given by s2 Q2/12, where Q 2F. This is called the quantization step size. It should be noted that a fixed-point system possesses both limited dynamic range and precision. Unless these weaknesses are properly managed, they can compromise system performance. Upon implementation, the performance of the candidate fixed-point filter needs to be analyzed mathematically and/or experimentally to determine if it still meets the design specifications. If the candidate design fails this test, then the design strategy will need to be altered by redefining the data format, architecture, or filter type. Afterward, the test will be repeated.
14.21 OVERFLOW ARITHMETIC The most serious finite wordlength effect is runtime register overflow. Register overflow can introduce significant non-linear distortion into a system’s output which can render a filter useless. It is therefore essential that the filter designer eliminate or control the effects of runtime register overflow. There are some standard techniques that can be used to control this problem. One effective means of controlling fixed-point overflow errors is to perform arithmetic using 2’s complement (2C) arithmetic unit. Two’s complement possesses an important modulo(2n) property that insures the sum of 2C numbers is a valid 2C outcome, then a 2C accumulator is tolerant to intermediate runtime register overflow. Another common method used to suppress the potential effects of register overflow is to use saturating arithmetic. A saturating arithmetic unit, upon detecting an overflow condition, clamps the accumulator output to the numbering system’s most positive or negative value. That is, the output of an N-bit 2C saturating arithmetic unit is defined to be (2N1 1) if ACC 2N1 ACC cACC if 2N1 ACC 2N1 1 N1 2 if ACC 2N1
(14-51)
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FIGURE 14-23
A saturating arithmetic operational behavior.
The operating characteristics of a saturating arithmetic unit are graphically interpreted in Figure 14-23.
14.22 REGISTER OVERFLOW Register overflow conditions can be mitigated by scaling the input to a level which will suppress or eliminate the possibility of a register to overflow. This method has a weakness in that determining the required scale-factor experimentally can be tenuous. The tested inputs may not represent an input worst case event and might therefore underestimate scaling needs. Furthermore, scaling reduces the precision of the input which, in turn, reduces output precision. Another means of eliminating runtime overflow is to use extended precision arithmetic and registers. Extended precision registers provide additional “head room” that will allow the filter, even under worst case conditions, to store and preserve a system’s states without introducing saturation errors. The preferred method of overcoming the threat of runtime overflow is to determine the worst case filter gain at each register or state location. This is an extension of the worst case design analysis introduced for the study of FIRs. The translation of an FIR into an IIR can be accomplished by assuming the FIR’s impulse response is infinitely long. Since a worst case analysis for an FIR was defined in terms of the filter’s impulse response, a similar strategy must be employed in the case of IIRs. If we assume that the input is bounded by |x[k]| Mx on a sample-by-sample basis, then the worst case input would be given by xworst_case[k m] Mx sign(hm)
(14-52)
where sign(hm) is the sign of hm (i.e., { 1}). For an IIR, the output response to the worst case input is given by `
`
`
m0
m0
m0
yworst_case[k] a hmxworst_case[k m] a hm M x sign(hm) M x a Zhm Z M x Gmax (14-53) where the parameter Gmax, found in Equation (14-53), is called the filter’s worst case gain and is given by `
Gmax a Zhm Z 2I
(14-54)
m0
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Technically, Gmax is the l1-norm of a filter’s input-output response. In order to adapt this FIR-based methodology for use with an nth-order IIR, the l1-norm of all the states of the system needs to be computed. This requires that n impulse responses, residing between input and state shift registers, needs to be determined. This can be facilitated using the filter’s state variable description of the selected architecture. From the elements of [A, b] of the state four-tuple [A, b, c, d ], n impulse responses can be computed from input to state n location using a number of mathematical techniques, and can be simulated as well by using h[k 1] Ah[k] bd[k]
(14-55)
where h[k] is an n-vector of impulse responses. Technically, the l1-norm on all the individual states would be defined by the infinite vector-valued sum `
y hi[k] y 1 a Zhi[m]Z
(14-56)
m0
where hi[k] is defined at the output of the ith shift register (for instance, state xi[k] location). Unfortunately, the production of Equation (14-56) requires the evaluation of an infinite sum. Assuming that the system is asymptotically stable, the impulse response will eventually converge to zero resulting in a finite steady-state value for y h[k] y 1. The number of samples needed to insure convergence can be determined using a principle eigenvalue analysis. Another, simpler method is to determine the l1-norm experimentally. In this mode, Equation (14-56) is approximated by a (possibly long) finite sum of sufficient length. MATLAB’s NORM function can be used as the l1 norm of the ith state’s impulse response to a given error tolerance. Once computed or estimated, the l1-norm y h[k] y 1 can then be employed to establish the dynamic range requirements of the state registers. This concept is motivated in the following example. Example 14-19 Dynamic Range Determination Required:
An 8th-order Chebyshev-II IIR low-pass filter is implemented as a Direct II and cascade architecture based on the following specifications: • Sampling frequency: 100 kHz • Attenuation frequency: 20 kHz • Stopband attenuation: 30 dB The following filter was designed using MATLAB’s FDA tool. The Direct II state twotuple [A, b] is given by 1.063 1.0000 0 0 A® 0 0 0 0
1.853 0 1.0000 0 0 0 0 0
0.841 0 0 1.0000 0 0 0 0
0.802 0 0 0 1.0000 0 0 0
0.083 0 0 0 0 1.0000 0 0
0.116 0 0 0 0 0 1.0000 0
0.016 0 0 0 0 0 0 1.0000
0.007 0 0 0 ∏; 0 0 0 0
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1 0 0 0 bH X 0 0 0 0 The cascade filter consists of the following 2nd-order sections: H1(z)
1 1.731z 1 z 2 1 0.240z 1 0.053z 2
H2(z)
1 0.524z 1 z 2 1 0.083z 1 0.266z 2
H3(z)
1 0.268z 1 z 2 1 0.469z 1 0.551z 2
H4(z)
1 0.583z 1 z 2 1 0.751z 1 0.841z 2
such that H(z) 0.078 H1(z) H2(z) H3(z) H4(z). Each 2nd-order Direct II section can be mapped to a state variable model using MATLAB’s SOS2SS function. The individual 2nd-order Direct II subfilters are shown next: A1 B
0.2404 1
0.0535 R c1 [1.4905 0
A2 B
0.0834 1
0.2664 R c2 [0.6075 0
0.7336]
A3 B
0.4688 1
0.5514 R c3 [0.2006 0
0.4486]
A4 B
0.7514 1
0.8414 R c4 [0.1686 0
0.1586]
0.946]
Determine the l1 state norms for both architectures. Results:
From the state-determined impulse response vector, the value of y h[k] y 1 can be estimated using a finite sum approximation to Equation (14-56). The production of the incremented value of y h1[k] y 1 is shown in Figure 14-24. Since all Direct II state-determined impulse responses have the same shape, differing only by simple delays, their l1 norms are identical. Upon computing y h1[k] y 1, using a finite sum approximation, the worst case gain is computed to be approximately G1 = 2.25. This indicates that the filter’s shift registers need an additional log2(2.25) ~ 1.17-bits of headroom. Since 1.17-bits is very close to one bit, a one-bit head room would generally be recommended. The l1 norms of the state-determined impulse responses of the cascade IIR are shown in Figure 14-25. The largest l1 norm is found in the fourth subfilter and is about 1.8 (log2(1.8) ~ 0.85-bits), which is less than the maximal l1 norm of the Direct II filter model. Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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Impulse response-direct II architecture 0.35 0.3 0.25 0.2 Amplitude
0.15 0.1 0.05 0 −0.05 −0.1 −0.15
0
10
20
30 40 50 Time (seconds)
60
70
80
I1 Norm-direct II architecture 2.5 ~2.25
I1 Norm estimate
2
1.5
1
0.5
0
0
20
40
60 80 Sample index
100
120
FIGURE 14-24 A Direct II impulse response measured at the x1[k] shift register location (top) and l1 norm estimate (bottom).
14.23 ARITHMETIC ERRORS The next most serious finite wordlength effect is called arithmetic error. To illustrate the source of arithmetic errors, consider the fixed-point multiply-accumulate (MAC) or SAXPY (S AX Y ) unit shown in Figure 14-26. It is assumed that A and X are N-bit digital words that are presented to a full-precision multiplier, producing a 2N-bit product. The 2N-bit full precision product may be reduced to an S-bit word, S 2N, before being presented to a T-bit accumulator (T S). The presence of the round by S operation varies from MAC-unit Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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I1 Norm-cascade architecture-stage 2 0.2
0.3
0.15
I1 Norm estimate
I1 Norm estimate
I1 Norm-cascade architecture-stage 1 0.4
0.2
0.1
0
0
2
4
6
8
0.1
0.05
0
10
0
5
Sample index
0.3
1.5
0.2
0.1
0
10
20
15
I1 Norm-cascade architecture-stage 4 2
I1 Norm estimate
I1 Norm estimate
I1 Norm-cascade architecture-stage 3 0.4
0
10
Sample index
1
0.5
0
30
~1.8
0
Sample index
20
40
60
80
Sample index
FIGURE 14-25 A cascade with an l1 norm estimate section by section. (From the upper-left corner, clockwise: Section 1, Section 2, Section 4, and Section 3.)
to MAC-unit. If T S, the accumulator is often referred to as being an extended precision accumulator. The T-bit accumulator is finally reduced to an M-bit final SAXPY outcome, where M T. It is generally assumed that the error associated with the case M V 2N is given by e ( y[k] Q F( y[k]))
(14-57)
where QF(q) denotes the quantization of a real number q to a digital word having F-bits of fractional precision. The error variance is given by s2
Q2 12
(14-58)
where Q 2F. The problem is not in modeling the production of the roundoff error itself, but determining what happens to the error after it is produced. This determination is important because errors generated internally to an IIR can be recirculated within the IIR indefinitely. Mathematical modeling of the arithmetic error process relies on the system being represented in state variable form. Recall that the state model equation is given by x[k 1] Ax[k] bu[k], where x[k] is an N-dimensional state vector. The output model is y[k] cTx[k] du[k]. Noise analysis is performed by studying the state model using roundoff error
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FIGURE 14-26
619
A fixed-point MAC unit.
sources to drive the filter rather than using the traditional input u[k]. To illustrate, notice that the equation (Equation 14-19) describing the ith next state xi[k 1] is found in the ith row of the state equation x[k 1] Ax[k] bu[k]. The production of xi[k 1] may therefore require up to N 1 multiply-accumulates. Let mi N 1 denote the number of rounding operations associated with the production of xi[k 1]. Each distinct roundoff operation contributes a random error of variance s2 Q2/12 to the production of xi[k 1] (Equation 14-58). If each full-precision product is rounded, then a roundoff error is injected into the ith state shift register for each aij, j H [1, N ], and di having a value other than {1, 0, 1} (in other words, it requires no multiplication). This is called a multiply-round-accumulate architecture. Referring to Example 14-16, m1 8, and m2 m3 c m8 0. If all the full precision products are first accumulated, and then rounded, at most one roundoff error is injected into a state register. For those cases where no multiplication is required to produce xi[k 1], mi 0. Such a system is called a multiply-accumulate-round architecture. Referring to Example 14-19, m 1 1, and m 2 m 3 c m8 0. It should be appreciated that the accumulators, in this case, will probably have to have extended precision in order to accumulate up to N 1 worst case products without overflowing. It can also be seen that the state xi[k] is sent to the output with a gain ci (ignoring the contribution of d ). For this interpretation, the predicted noise power gain (NPGi) defined from the input of the ith state to the output can be computed. Define NPGi Wii for i H [1, N] to be the noise power-gain that defines the noise power amplification of roundoff noise injected into the ith state and appearing at the IIR’s output. Collectively, the output noise error variance becomes
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s2
Q2 N Q2 N Q2 miWii miNPGi (NPG) a a 12 k1 12 k1 12
(14-59)
where mi defines the number of independent roundoff error sources attached to the input of the ith shift register. The filter’s noise power power-gain, denoted NPG in Equation (14-59), can also be interpreted in bits using NG 2NPG
(14-60)
NG2 log 2(NG) bits
(14-61)
and then computing
NG2 is an estimate of the statistical degradation of IIR’s output, in bits, due to accumulated roundoff errors residing within the filter. The calculation of NPGi or Wii can be accomplished using a formula obtained from the classic Lyapunov stability theory, which states W ATWA cc T
(14-62)
where Wii is the ith on-diagonal term of W, for i H [1, N]. W can also be computed using the iterative algorithm Initialize: W0 ccT Loop on i W[i 1] ATW[i]A W0
(14-63)
Continue until W[i 1] W[i] ~ [0] W[i 1] 1 W The production of the matrix W can be bypassed using simulation. Both the analytic and experimental study of noise power gain is illustrated in the following example. Example 14-20 Finite Wordlength Effects Required:
The 8th-order Chebyshev-II IIR low-pass filter studied in Example 14-19 was implemented as a Direct II and Cascade architecture. Determine the noise power gain for each filter if extended precision registers are used along with a multiply-accumulate-round architecture. Results:
The statistical noise power gain of each design can be predicted by calculating the elements of the Lyapunov matrix W. For the Direct II design, analysis produces W11 c W88 0.35. The design assumes that extended precision accumulators are used, resulting in m1 1 and m2 m3 c m8 0. Correcting for the scale factor k 0.078, the noise power gain is predicted to be NPG W11/k12 58.5 or NG2 7.63, which corresponds to approximately three bits of lost precision in the IIR’s output. The noise power gain for the four-stage cascaded subfilters was determined to be Stage i
NPGi
1 2 3 4
3.848 1.04 0.47 0.307
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The cascaded noise power gain is given by NPG NPG1 NPG2 NPG3 NPG4/k2 94.91, or NG 9.74, which corresponds to about a 3.3-bit loss in output precision at the IIR’s output (approximately 0.5-bit more than the Direct II model). The Lyapunov-based method, it should be noted, is based on a number of assumptions that may not completely characterize a filter. It can, however, provide an analytical means of mathematically comparing two or more filters and architectures. Another means of quantifying the statistical behavior of an IIR is using fixed-point simulations. This can be facilitated using a number of contemporary block diagram simulation languages. The following example demonstrates the use of simulation in the study of fixed-point filters. Example 14-21 Fixed Point Simulations Required:
Assume the IIRs from Example 14-19 are implemented using an N 16-bit processor possessing full precision multipliers, extended precision accumulators, and a multiplyaccumulate-round architecture. Results:
Using MathWorks’ Simulink, an end-to-end fixed-simulation of the 8th-order filter implemented as a Direct II and Cascade filter architectures in Example 14-19, was performed. The key architectural choices defining the simulation: Data wordlength: N 16-bits Fractional precision: F H [0:15]-bits. Input data format: x[k] H [N:F]-bits Output data format: y[k] H [N:F]-bits Coefficient data format: ck H [N:F]-bits Multiplier data paths: 16 16 → 32-bits Multiplier data paths: 16 16 → 32-bits Direct II accumulator data paths: 32 (32 NDII) → 32 NDII-bits (NDII log2(2.25) ~ 1.17-bits) Cascade accumulator data paths: 32 (32 NC) → 32 NC-bits (NC log2(1.8) ~ 0.8-bits) The numerical results of the fixed-point simulation are presented in Figure 14-27 for both architectures. The input forcing function was a long unit-bound uniformly distributed random signal that emulated, at some point in its history, a worst case input. Reviewing the simulated outcome from Figure 14-27, it can be noted that the result can be partitioned into three regimes, namely: • Too little precision—caused by too few fractional bits of accuracy. • Linear regime—sufficient dynamic range to inhibit runtime overflow and sufficient fractional precision to eliminate traumatic roundoff errors. • Too little dynamic range—caused by too few integer bits resulting in a too small dynamic range that results in a plethora of runtime overflow errors. It can be seen that the Direct II architecture exhibits overflow contamination beginning at two integer bits as predicted by the l1 norm analysis. The Cascade filter began exhibiting register overflow beginning at 1 integer bit as predicted. Moreover, the
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CHAPTER FOURTEEN
Statistical filter performance versus the number of fractional bits.
Direct II has slightly better statistical precision over the linear input-output operating range, which was again predicted by the analytical study. In the linear region, the analysis predicted that the Cascade architecture is about 0.3-bit inferior to a Direct II. This too was predicted. The simulation would suggest that the optimum Cascade filter carry a [16:14] format, resulting in a solution having (statistically) about 11.5 fractional bits of precision. The simulation also suggests that the Direct II filter carry a [16:13] format, resulting in a solution having (statistically) about 11 fractional bits of precision. The conclusion is that the optimum performance point of a fixed-point IIR can be predicted using analytical techniques from a simulation environment. The advantage of the simulation approach is manifold. First, it is easier and faster to construct than creating the tools and environment needed to complete an alternative analytical filter analysis. Second, it is more robust, capable of handling any arbitrary architecture. Third, it is extensible and can be easily modified (for example, a change of design specification). Fourth, it provides open access to the entire signal-processing elements used to construct the simulation. What must be stressed is that the system was studied under worst case conditions. Analyzing the system using impulse or sinusoidal test signals will produce different and erroneous results.
14.24 COEFFICIENT ROUNDING ERRORS The third most serious source of finite wordlength error is attributed to coefficient rounding. A general IIR model is based on factoring the filter’s transfer function H(z). Analytical methods have been developed that are analogous to sensitivity analysis techniques used to
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study analog filters. These methods are based on computing partial derivatives but can only claim to explain the effects of infinitesimal localized coefficient errors. Coefficient rounding errors typically need to be significant if they are to have any affect on filter performance. With the advent of 16-bit DSP ps and beyond, coefficient rounding errors have become less and less a factor in a successful IIR design. The preferred means of quantifying the effects of coefficient rounding is simulation. The filter coefficients can be quantized to a selected precision, and a simulation be performed using floating-point arithmetic. The difference between the ideal and simulated forced responses is assumed to be attributed to coefficient rounding. Coefficient rounding error is the subject of the following example. Example 14-22 IIR Coefficient Rounding Sensitivity Required:
A 6th-order Chebyshev I low-pass IIR has a transfer function H(z) 0.0096311
1 1.577z
1
1 6z 1 15z 2 20z 3 15z 4 6z 5 z 6 2.4674z 2 2.2984z 3 1.6613z 4 0.7977z 5 0.2354z 6
The filter is implemented as a Direct II and Cascade IIR. In both cases, the filters are implemented using the input scale factor k 0.0096311 2–6.698. Rounding k to less than six bits will result in the zeroing of the input scale factor (that is, krounded 0) completely nulling the input. Determine the coefficient rounding effects for the Direct II and Cascade filters using a [16:8] format. Results:
Using simulation, the IIR’s frequency response and group delay are reported in Figure 14-28. The primary difference between the responses can be attributed to rounding the input scale factor. The eight-bit rounding of k to 0.0078125 introduces a 20-percent downward change in value. The remaining physical effects of coefficient rounding are quantifiable, but seen to be relatively benign. You should know that Cascade architecture has a slight advantage over the Direct II, but represents a slightly more complex implementation.
14.25 SCALING Register overflow can be inhibited by reducing the dynamic range of the input. Scaling the input by a positive constant, k 1, reduces the chance of runtime overflow. Unfortunately, scaling also reduces the output precision. In particular, the precision of a scaled data word will be reduced by log2(k)-bits. Equivalently, the output precision will be reduced by a like amount. Therefore, the error variance of the scaled system, compared to the unscaled system, can be expressed as s2k
(kQ)2 k 2s2 12
(14-64)
As a result, scaling (if required) should only be used minimally and only to the point where overflow is controlled. Using extended precision registers can preserve precision, but does so with an added hardware penalty.
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FIGURE 14-28 The magnitude frequency response of a Chebyshev I, Direct II, and Cascade implementation using a [16:8] format (top) and the group delay for a [16:8] coefficient format (bottom). (The frequency was normalized with respect to fs/2.)
14.26 ZERO INPUT LIMIT CYCLING Another finite wordlength effect is called zero input limit cycling, or simply limit cycling. Limit cycling causes a digital filter to produce small amplitude changes to appear at the system’s output during periods when the input is zero. In voice communication applications, limit cycling can manifest itself as undesirable audible “clicking” sounds that can be heard during quiet (unvoiced) periods. The first generation DSP microprocessors were imprecise (for example, eight bits), and as a result, limit cycling was an annoying problem that could only be reduced through serious engineering labor. With the advent of 16-bit, 24-bit, and floating-point processors, limit cycling has become a secondary problem. Limit cycling is caused when the response of an unforced stable filter does not successfully decay to zero due to finite wordlength effects. Consider, for illustrative purposes, the simple 1st-order system y[k] ay[k 1] x[k]
(14-65)
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FIGURE 14-29 Limit cycling for the unforced system y[k] ay[k 1] x[k], x[k] 0, using a four- and eight-bit fractional precision. Limit cycling is associated with the low-bit resolution response.
If k a k 1, then y[k] → 0 when x[k] 0. If the filter is implemented in fixed-point, then y[k] Q F[ay[k 1]] x[k]
(14-66)
where QF[q[k]] denotes the quantized value of q[k] to F fractional bits of accuracy. Refer to Figure 14-29 and suppose that at the sample instance k, the 1st-order response is y[k] when the input has been x[k] 0 for all k K. If the decay rate of the quantized system is slow (too slow), then the output will decay to an amount less than half a quantization interval (such as [k] (y[k] y[k 1]) Q/2), then upon rounding, y[k] would be returned to its previous value y[k 1]. As such, the output would never be able to decay to zero and would have some constant off-set (possibly oscillating), which is called limit cycling. The effects of limit cycling are studied in the following example. Example 14-23 Limit Cycling Restore Title Required:
Suppose a system y[k] ay[k – 1] x[k] has a [N:4] format and a 1/2, –1/2, 3/4, and 3/4. Investigate the zero input limit cycling properties of the system. The implementation of these four filters would yield the results shown next. The data is interpreted in Table 14-7 Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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TABLE 14-7 A Zero-Input Limit Cycling Example k
a 1/2 01000
a 1/2 11000
a 3/4 01100
a 3/4 11100
0 1 2 3 4 5 6 7 8 9 k
01111 (15/16) 01000 (8/16) 00100 (4/16) 00010 (2/16) 00001 (1/16) 00001 (1/16) 00001 (1/16) 00001 (1/16) 00001 (1/16) 00001 (1/16) limit cycling at y[k] 1/16
01111 (15/16) 11000 (–8/16) 00100 (4/16) 11110 (–2/16) 00001 (1/16) 11111 (–1/16) 00000 (0/16) 00000 (0/16) 00000 (0/16) 00000 (0/16) no limit cycling
01111 (15/16) 01011 (11/16) 00110 (6/16) 00101 (5/16) 00100 (4/16) 00011 (3/16) 00010 (2/16) 00010 (2/16) 00010 (2/16) 00010 (2/16) limit cycling at y[k] 2/16
11111 (15/16) 10101 (11/16) 00110 (6/16) 11100 (4/16) 00011 (3/16) 11101 (3/16) 00010 (2/16) 11111 (1/16) 00001 (1/16) 11111 (1/16) limit cycling at y[k] ( 1/16)k
for a five-bit 2’s complement implementation using as an initial condition x[0] 1 → 01111 where denotes the binary point. Determine whether limit cycling can occur. Results:
The output response is computed for each choice of a and is reported in Table 14-7. The data indicates limit cycling for a {1/2, 1/2, 3/4, 3/4}. The 4 IIR zero input responses are simulated for four- and eight-bit solutions in Figure 14-29. The filter is initialized to x[0] 1.0 and then run. Note that limit cycling can take place under certain circumstances and that the severity of limit cycling is a function of the decay rate of the response (for example, “a”) and the number of bits of arithmetic precision maintained after multiplication. The threat of limit cycling for a 16- or 24-bit design, especially those containing extended precision arithmetic, is very small and negligible.
BIBLIOGRAPHY Antoniou, A. Digital Filters: Analysis and Design. New York: McGraw-Hill, 1979. Ifwachor, E., and B. Jervis. Digital Signal Processing. 2nd ed. Reading, Massachusetts: AddisonWesley, 2001. Mitra, S. Digital Signal Processing. New York: McGraw-Hill, 2001. McClellan, J. H., Parks, T. W., and L. R. Rabiner. “A Computer Program for Designing Optimum FIR Linear Phase Filters.” IEEE Trans. On Audio and Electroacoustics (December, 1973). Oppenheim, A. V. and R. S. Schafer. Digital Signal Processing. Englewood Cliffs, New Jersey: Prentice-Hall, 1975. Proakis, J., and D. Manaolakis. Digital Signal Processing. 3rd ed. Englewood Cliffs, New Jersey: Prentice-Hall, 1996. Rabiner, L. A., Kaiser, J. F., Herrmann, J., and M. T. Dolan. “Some Comparisons Between FIR IIR Digital Filters.” Bell System Tech. Journal (February, 1974). Taylor, F. J. Digital Filter Design Handbook. New York: Marcel Dekker, 1983. ——— and T. Stouraitis. Digital Filter Design Software for the IBM PC. New York: Marcel Dekker, 1987. Zelniker, G. and F. Taylor. Advanced Digital Signal Processing: Theory Applicants. New York: Marcel Dekker, 1994.
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MULTIRATE DIGITAL FILTERS
15.1 INTRODUCTION TO MULTI-RATE SIGNAL PROCESSING A digital filter accepts a time-series input, produces a time-series output, and in-between modifies the signal in terms of its time and/or frequency domain attributes. Digital filters are normally assumed to operate, end-to-end, at a constant sample-rate fs where the samplerate bounds on the fixed sample rates are established by Shannon’s Sampling Theorem. Some systems are designed to operate at, or near, the Nyquist sample rate and are said to be critically sampled. Other systems operate well above the minimum sample rate and are called over sampled. Over sampling can require the use of high speed arithmetic units. In some instances, however, over sampling can reduce design complexity of other parts of the system. This is illustrated in the following example. Example 15-1 Audio over Sampling Required:
It is normally assumed that the audio spectrum is band-limited to 20 kHz. Therefore, a standard multimedia 44.1 kHz ADC can provide alias-free data conversion. The input to the ADC, however, should be passed through an analog anti-aliasing filter having a 20 kHz passband and a stopband beginning at 22.05 kHz, or earlier. The problem is that the anti-aliasing filter’s transition band is only f 4.1 kHz wide, which is far too narrow to be realized by any practical analog filter (see Figure 15-1). It is claimed that the design requirements on the analog anti-aliasing filter can be relaxed by over sampling the audio signal by a factor of four (that is, 4x). Analyze the consequences of over sampling on the design of the analog anti-aliasing filter. Results:
The 4x audio system is assumed to be sampled at fs 4 44.1 kHz 176.4 kHz. The new Nyquist frequency is therefore 88.2 kHz. Referring to Figure 15-1, it can be seen that the end of the new analog anti-aliasing filter’s transition band can, in fact, range out to 156.4 kHz. Designing the required shallow skirt analog anti-aliasing with respect to the new specifications is very manageable. There are instances when it is preferred, or required, to operate different parts of a filter at different sample rates. Filters operating with multiple sample rates are naturally called multirate digital filters. Multirate digital filters can perform a number of tasks, including sample rate conversion and signal bandwidth compression. A fixed-rate sample rate filter, for example, may require K arithmetic operations per filter cycle. Reducing the sample rate of a signal by a factor M, reduces the arithmetic bandwidth requirements by a like amount. 627 Downloaded from Digital Engineering Library @ McGraw-Hill (www.digitalengineeringlibrary.com) Copyright © 2006 The McGraw-Hill Companies. All rights reserved. Any use is subject to the Terms of Use as given at the website.
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FIGURE 15-1 An over-sampled (4x) audio system with an analog anti-aliasing filter’s stopband set to 88.2 kHz.
In other applications, multirate systems are used to achieve performance levels beyond that obtainable with a fixed-rate system.
15.2 DECIMATION Filter sample rates can be altered using an operation called decimation or down sampling. If a time-series x[k] is imported at a sample rate fs, and exported at a rate fd, such that fs fd, then the signal is said to be decimated 1 by a factor M, where M fs /fd
(15-1)
For a given integer M, the decimated time-series is mathematically given by xd[k] x[Mk]
(15-2)
indicating that only every Mth sample of the original time-series is retained and all others ignored. The decimated time-series also operates at a reduced speed fd fs /M Sa/s. This process is shown in Figure 15-2 for M 2 case. A decimated by M time-series can be formally modeled as `
xd[k] a x[n] d[k nM]
(15-3)
n`
1 Historically, decimation originally referred to a disciplinary method employed by the Romans in dealing with mutinous soldiers. The mutineers were forced to select balls from an urn containing nine times more white balls than black balls. The holders of black balls would be put to the sword. The result was that every tenth soldier was slain.
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FIGURE 15-2 An illustrated decimate by two processes.
results in a z-transform given by `
`
`
n`
m`
Xd(z) a xd[n]zn a zn a a x[n] d(m nM)b n` `
`
`
`
n`
m`
n`
n`
a x[n]a a zn d(m nM)b a x[n]znM a x[n](zn)M X(zM ) (15-4) In the frequency domain, Equation (15-4) can be expressed as Xd (ej) X(ejM)
(15-5)
and is graphically interpreted in Figure 15-3. The input signal’s spectrum is assumed to be limited to B Hz and the base band is constrained by Nyquist frequency fs /2 for the undecimated signal. The decimated signal’s spectrum is also base band limited to B Hz with respect to a new Nyquist frequency of fs /2M. A decimation by two case is studied in the next example. Example 15-2 Decimation Required:
In Example 15-1, a 4x over-sampled solution was investigated. The output sample rate for the over-sampled system was fs 176.4 kHz. The sample rate can be returned to the
FIGURE 15-3 The magnitude spectrum of a signal x[k] and decimated by M signal, denoted xd[k], and plotted on a common frequency axis.
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multimedia rate fd 44.1 kHz by decimating the over-sampled signal by four. Analyze the consequence of this action. Results:
Suppose the audio spectrum is considered to be represented by a single tone located at f (1000/16) Hz. Using Euler’s equation, the signal’s spectrum is mathematically defined to be X(ej) 0.5 d( 2p103/16) 0.5 d( 2p103/16) with respect to the 4x sampled rate fs. The time-series and spectrum are shown in Figure 15-4. Upon decimating by M 4, Equation (15-5) defines the decimated spectrum to be Xd(ej) X(ej4) 0.5 d(( 2p103)/4) 0.5 d(( 2p103)/4) with respect to the decimated sample rate of fs /4 44.1 kHz. The decimated time-series and spectrum are also displayed in Figure 15-4. It can be seen that the tone is present at its original frequency location, but the width of the output base band has decreased by a factor of four. In Example 15-1, a relaxed analog anti-aliasing filter was facilitated by over-sampling. What should be appreciated is that any spectral energy found at the analog anti-aliasing filter’s input residing beyond f 22.05 kHz will be aliased into the decimated base band. In most audio applications, however, the analog recording spectrum is usually clean beyond 20 kHz and is also free of system-generated noise out to the onset of digital clock noise. Under these assumptions, the choice of a relaxed anti-aliasing filter is valid. Shannon’s sampling theorem also applies to multirate signals and systems. Suppose the highest frequency found in the time-series x[k] is B Hz, as suggested in Figure 15-5. Aliasing can be avoided if the decimated sample rate exceeds fd 2 B Hz. This means that there is a practical upper limit to decimation. Referring to Figure 15-5, it can be seen that for alias-free decimation to take place: fs BB M
or
M
fs 2B
(15-6)
Increasing the decimation rate beyond this value will potentially produce an aliased decimated time-series. In practice, the maximal decimation rate is rarely used. Instead, a more conservative value is generally used, which will allow for a well-defined guard band to be established, as suggested in Figure 15-5. The next example studies the question of maximum decimation rate.
FIGURE 15-4 Shown are an original time-series x[k] and decimated by M 4 signal, along with their corresponding magnitude frequency responses.
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FIGURE 15-5 An unaliased and aliased decimated signal spectra.
Example 15-3 Maximum Decimation Rate Required:
Suppose that the signal x(t) cos(2 p 103t), having a frequency B 103 Hz, is over-sampled at a rate fs 105 Hz to form x[k]. Determine the maximum decimation rate that can be applied to x[k] that will insure alias-free performance. Analyze the decimated signal spectrum for decimation rates of M 16 and 64. Results:
The minimum lower bound on the sampling rate (in other words, the Nyquist frequency) is 2 103 Hz. Therefore, the maximum decimation rate is bounded by M 105/(2 103) 50. The spectrum of the undecimated and decimated signal by a factor 16 signals are reported in Figure 15-6 along a common base band frequency range f H [0, 105/2). The corresponding time-series are also shown in Figure 15-6. Note that the decimated spectrum contains copies (artifacts) of the base band signal on fs /16 Hz centers. The predicted maximum decimation factor was 50 which implies that decimating by 64 should result in aliasing. The resulting decimated by 64 time-series is also shown in Figure 15-6 and is seen to impersonate (alias) a signal having a base-band frequency equal to f1 103 mod(105/64) 562.4 Hz (Equation 12-8). The aliased signal, namely xd[k] cos(2pf1k), is superimposed over the decimated time-series sample values in Figure 15-5. Band-limited signals can also be decimated. Decimating such signals results in both a rearranged as well as a translated spectrum. The signal shown in Figure 15-7 has passband activity residing between mp/M (m 1) p/M, where m is a positive integer. Decimating the band-limited signal by a factor M results in the spectrum shown in Figure 15-7. The specifics of the decimated spectrum are predicated on whether m is an even or odd integer. If m is odd, the spectrum is a reflection of the original spectrum which can be compensated for (that is, reversed) by multiplying the decimated time series, xd[k], by (1)k. The following example illustrates how decimation can effect the spectrum of a bandlimited signal. Example 15-4 Decimated Band-Limited Signal Required:
Using computer simulation, analyze the spectral behavior of a decimated band-limited signal.
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FIGURE 15-6 Shown are (top) magnitude frequency responses (line spectrum) of x[k], (middle) original x[k], and decimated by 16 and 64 versions of the signal, and (bottom) an overlay of x[k] and decimated by 64 signal showing the aliased image.
Results:
Consider the spectrum of a time-series x[k] having the lowest harmonic located at fLO mfs /M, as suggested in Figure 15-7. Decimation by M are reported in Figure 15-8 for m 1(odd) and m 2(even). Note that for m odd (m 1) and a decimation factor of M 8, the base-band spectrum shows a reflection about f 0 (DC). The reflection distortion can be corrected by modulating the decimated signal by (1)k. For m even (m 2), the decimated spectrum is seen to be nonreflected.
FIGURE 15-7 The spectra of decimation band-limited signals for m even and odd, showing different baseband symmetries of the aliased spectra.
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FIGURE 15-8 Shown are (left) a band-limited spectrum for m 1 and decimation factor of M 8. The base-band spectrum is shown to be reflected about f 0 (DC). The spectrum shown in the middle of the figure is the same as that displayed on the left with a corrected reflection using a modulation of the decimated time series by (1)k. The right panel displays the spectrum of a band-limited signal for m 2 (top) and after decimation by M 8 (bottom). The base-band spectrum is shown correct in its decimated form.
15.3 INTERPOLATION The antithesis of decimation is called interpolation or up-sampling. The use of the verb interpolation is somewhat unfortunate since interpolation also defines a class of methods used to reconstruct a facsimile of an analog signal x(t) from a sparse set of samples x[k]. In the context of decimation and interpolation, interpolation simply refers to a mechanism that increases the effective sample rate. Interpolating a time-series x[k], sampled at a rate fs by a factor N, creates a new time-series xi[k] given by xi[k] b
x[k] 0
if k 0 mod N otherwise
(15-7)
or `
xi[k] a x[k] d[k mN ]
(15-8)
m`
Interpolation by N is seen to be equivalent to inserting N 1 zeros in between the samples of the time-series being interpolated. This action is sometimes referred to as zeropadding. The result is a new time-series sampled at a rate fi Nfs, as shown in Figure 15-9.
FIGURE 15-9 An illustration of an interpolation by N process.
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Interpolation is often directly linked to decimation. To illustrate, suppose xd[k] is a decimated by M version of the time-series x[k] which was sampled at a rate fs. The decimated signal is therefore sampled at a rate fd fs /M. Interpolating xd[k] by a factor N would result in a new time-series xi[k]. The sample rate of the interpolated signal is increased from fd to fi Nfd Nfs /M. If N M, the output sample rate would be restored to that of fs. Relative to the decimated signal xd[k], the frequency-domain signature of an interpolated by N signal xi[k] can be defined in terms of the z-transform of Equation (15-8). Specifically: `
`
`
m`
k`
m`
Xi(z) a xd[m] a zk d[k mN ] a xd[m]zmN Xd(zN)
(15-9)
In the frequency-domain, Equation (15-9) states that Xi(ejv) Xd( ejNv )
(15-10)
To illustrate, the frequency-domain representation of an interpolated by 2 signal is illustrated in Figure 15-10. It can be noted that the interpolated and original base-band spectra are identical out to fs /2. Thereafter, the interpolated base-band spectrum continues out to Nfs /2, carrying with it a number of artifacts on fs centers. An illustrated example of an interpolation by two case is shown in the next example. Example 15-5 Interpolation Required:
Examine an interpolated by 16 signal by applying a gating function to a pre-decimated signal, as suggested in Figure 15-11. The gating function is periodically “on” for one sample out of N, and off for N 1 samples. Analyze the spectral properties of the interpolated signal. Results:
A low-frequency multitone process is sampled at a rate fs /N and displayed in Figure 15-11. The signal is then interpolated by 16 and its spectrum is analyzed. Observe that the resulting interpolated signal’s spectrum contains copies of the base-band spectrum located on fs /N (N 16) centers.
FIGURE 15-10
Frequency response of a signal interpolated N 2.
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FIGURE 15-11 The gating function model of the interpolation process (top), interpolated time-series (middle), and the spectrum of the interpolated time-series (bottom) showing interpolated images (artifacts) from the original base-band spectrum.
The signal spectrum found at the output of an interpolator, shown in Figure 15-12, preserves the original base band along with periodically spaced artifacts. The unwanted copies, or artifacts, generally need to be removed, using a digital filter, before the signal can be made useful. An ideal Shannon interpolating filter, while being optimal, is not physically
FIGURE 15-12 The spectra of an original signal, zero-padded interpolated signal, and a filtered base-band signal. Also shown is the magnitude response of an artifact removal filter.
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realizable. A low-pass filter having a pass band defined over f H (fs /2N, fs /2N) is generally used as an interpolating filter.
15.4 SAMPLE RATE CONVERSION A commonly encountered signal processing problem is interfacing two systems having dissimilar sample rates, say f1 and f2. Such a system was earlier called a sample rate converter. If the ratio of f1 to f2 is a rational fraction, then direct decimation of interpolation can be used to achieve a sample rate conversion. To illustrate, suppose k N/M
(15-11)
where N and M are integers and f2 kf1. The system described in Figure 15-13 is called a non-integer sample-rate converter. The indicated low-pass digital filters preserve specific functions. The low-pass filter having a normalized cutoff frequency of p/L removes interpolated artifacts and is called an anti-aliasing filter. The two filters can also be combined into a single filter, as shown in Figure 15-13.An example of sample rate conversion is presented next. Example 15-6 Sample Rate Conversion Required:
Two audio subsystems are to be connected. One has a sample rate of 44.1 kHz (multimedia) and the other is sampled at 48 kHz (audio tape). Design a solution. Results:
Equation (15-11) states that k 48,000/44,100 160/147. Unfortunately, k can be factored no further. The implication is that multimedia systems running at a rate of 44.1 kHz will need to be interpolated by a factor of 160 out to a frequency of 7.056 MHz. This requires that the interpolation filter processes data at a high speed and has a passband that is only 22.05 kHz wide (3 percent of the sample frequency). Such filters are extremely difficult to design. The anti-aliasing low-pass filter, located before the decimator, must have a bandwidth no greater than 24 kHz, based on a 48 k Sa/s output. This filter is likewise difficult to realize. The two digital low-pass interpolating and aliasing filters, if cascaded (see Figure 15.14) would encounter the same problem. An alternative solution would be to convert the 44.1 kHz signal into analog form using a common DAC with appropriate output smoothing, and then resample the analog signal at 40 kHz.
FIGURE 15-13
An equivalent sample rate conversion system.
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FIGURE 15-14
Two equivalent sample-rate converter architectures.
15.5 POLYPHASE REPRESENTATION The study of interpolated and decimated signals can be unified using multirate polyphase modeling techniques. The polyphase modeling process begins with knowledge of a timeseries x[k] and that it can be partitioned into the M distinct data sequences shown in Equation (15-12). This process is called block decomposition. x[0] x[1] BD E x[2] ( x[M 1]
x[M] x[M 1] x[M 2] ( x[2M 1]
x[2M] x[2M 1] x[2M 2] ( x[3M 1]
c c c
B B B
x0[k] x1[k] x2[k]
f c
B
xM1[k]
(15-12)
The ith block in the block decomposition data array is given by xi[k] 5x[i], x[M i], x[2M i], x[3M i], c6
(15-13)
The ith block can be recognized to be equivalent to decimating the original time-series x[k] by M, beginning at sample index k i. In terms of a z-transform, the block decomposed data can be expressed as (x[0] z Mx[M] z 2Mx[2M] c) z 1(x[1] z Mx[M 1] z 2Mx[2M 1] c) BD(z) d t c c c c z (M1)(x[M 1] z Mx[2M 1] z 2Mx[3M 1] c) (15-14) The ith row of Equation (15-14) defines the ith polyphase term Pi(z). Specifically: `
Pi(z) a x(kM i)zk
(15-15)
k`
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The polyphase terms can then be used to synthesize the z-transform of x[k] as `
M1
k0
i0
X(z) a x[k] zk a ziPi(zM)
(15-16)
The polyphase representation of a time-series is developed in the following example. Example 15-7 Polyhase Representation Required:
Represent the repeating time-series x[k] {. . . , 0, 1, 2, 3, 4, 3, 2, 1, 0, 1, 2, 3, 4, 3, 2, 1, 0, 1, 2, 3, 4, 3, 2, 1, . . .}, where x[0] 0, in polyphase form for M 4. Results:
From Equation (15-15), it follows that P0(z) {. . . 0z0 4z1 0z2 4z3 . . .}, P1(z) {. . . 1z0 3z1 1z2 3z3 . . .}, P2(z) {. . . 2z0 2z1 2z2 2z3 . . .}, and P3(z) {. . . 3z0 1z1 3z2 1z3 . . .}. It therefore follows from Equation (15-16) that X(z) P0(z4) z0 P1(z4) z1 P2(z4) z2 P3(z4) z3. A multirate system can also be described in transposed polyphase form defined in terms of Qi(z), where Qi(z) PM1i(z)
(15-17)
This results in an equivalent polyphase signal representation are given by M1
X(z) a z(M1i)Qi(zM)
(15-18)
i0
A polyphase signal representation can be used to examine the physical act of decimation. Consider a time-series x[k] which is decimated by a factor M to produce a new timeseries xd[k]. According to Equation (15-15), P0(z) is recognized to be the time-series x[k] decimate by M time-series beginning at index k 0. The decimation equation representing P0(z) can be expressed in a more complicated form as 1 k 1/M j2p/M a X A WMz B ; WM e M k0 M1
P0(z)
(15-19)
The added complexity is needed to provide a mathematical connection between the sparse (decimated) sample set found in P0(z) and the densely sampled data set represented by X(z). The efficacy of Equation (15-19) can be explored by performing a term-by-term analysis to achieve 1 k 1/M a X A WMz B M k0 1 1/M DB A X C W0Mz1/M D X C W1Mz1/M D X C W2Mz1/M D c X C WM1 M z M x[0] x[1]z1/M x[2]z2/M c x[M]zM/M c M/M x[0] x[1]W1Mz1/M x[2]W2Mz2/M c x[M]WM c 1 Mz 5 d t M c. c. 1/M x[0] x[1]WM1 x[2]W2(M1) z2/M c x[M]WM(M1) zM/M c M z M M M1
P0(z)
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1 5Mx[0] 0x[1]z1/M 0x[1]z2/M c Mx[M]zM/M c6 M 1 (Mx[0] Mx[M]zM/M c) (x[0] x[M]z1 c) M
639
(15-20)
where z1 represents a single clock delay at the decimated clock rate (in other words, Td MTs M/fs) and z1/M corresponds to a 1/Mth clock delay at the undecimated clock rate. In this case, the temporal value of a single 1/Mth clock delay is Ts. The polyphase decomposition formula is studied to decimation rates of two and four in the next example. Example 15-8 Polyphase Decomposition Required:
The time-series x[k] ak u[k], Z a Z 1, is sampled at a rate of fs and represents a decaying exponential. Interpret x[k] and P0(z) in the context of Equation (15-20) for M 4. Results:
For M 4, xd[k] x[4k] {1, a4, a8, . . .} and P0(z) 1 a4z1 a8z2, . . . , measured at the decimated sample rate of fd fs /4 (note: P0(z4) 1 a4z4 a8z8, . . .), the individual terms found in Equation (15-20) are X A W04z1/4 B X(z1/4) a akzk/4 `
k0
51 az1/4 a2z2/4 a3z3/4 a4z1, c6
X A W14z1/4 B X(jz1/4 B a (j)k/4akzk/4 `
k0
5 51 jaz1/4 a2z2/4 ja3z3/4 a4z1, c6
X A W24z1/4 B X(z1/4) a (a)kzk/4 `
k0
51 az1/4 a2z2/4 a3z3/4 a4z1, c6
X A W34z1/4 B X( jz1/4) a ( j)k/4akzk/4 `
k0
5 51 jaz1/4 a2z2/4 ja3z3/4 a4z1, c6
And when combined under Equation (15-19), produce 1 A X A W04z1/4 B X A W14z1/4 B X A W14z1/4 B X A W14z1/4 B B 4 1 a4z1 a8z2 c
P0(z)
as required. A logical question can be raised and relates to the preferred location of the decimator in a signal processing stream. The two systems shown in Figure 15-15 are claimed to be functionally equivalent. This relationship is sometimes referred to as the noble identity. The topmost path consists of a decimator with the filter running at a decimated speed of fd fs /M. The bottom path consists of a filter, running at a speed of fs, followed by a decimator. Both filters have the same number of coefficients and therefore the same arithmetic complexity. The major difference between the circuits is found in the rate at which the filter arithmetic
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FIGURE 15-15
Equivalent decimated systems (Y1(z) Y2(z)).
must be performed. The topmost filter has a real-time arithmetic rate requirement that is 1/Mth that of the bottom filter. Therefore, the top architecture shown in Figure 15-15 is generally preferred due to its reduced computational requirement. A 4th-order polyphase filter is demonstrated in the next example. Example 15-9 Polyphase Filter Required:
An FIR filter has a given transfer function H(z) 2 3z1 3z2 2z3. Analyze the complexity and performance of the two filter instantiations shown in Figure 15-15 for M 2. Results:
For M 2, it follows that H(z) P0(z2) z1P1(z2) [2 3z2] z1[3 2z2]. The polyphase implementations of the two filter options, presented in Figure 15-15, are detailed in Figure 15-16. Both designs implement a 4th-order FIR using two interleaved 2nd-order polyphase FIRs. The data being processed by Filter A arrives at a rate that’s half of that seen by Filter B. Compared to Filter B, Filter A would therefore have the lowest arithmetic demand (MAC/s) of the two choices. A sample-by-sample analysis of the filtering process displayed in Figure 15-16 and reported in Table 15-1 in terms of the time-series appearing at the output of each 2ndorder filter stage. Specifically: Both filters produce identical outputs that appear at the decimated rate fs /2. It can also be seen that the polyphase Filter A is economical from an arithmetic resource need.
FIGURE 15-16
Equivalent 4th-order polyphase filters.
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yB[k]
wB[k]
h[k]
g[k]
f [k]
e[k]
yA[k]
...
d[k]
3x[1] 2x[1]
x[1]
2x[0] 3x[1]
... 2x[1] 3x[0]
2x[0] 3x[2]
2x[1] 3x[1]
x[0]
x[1]
3x[2] 2x[3] 3x[1] 2x[2] 2x[0] 3x[1] 3x[2] 2x[3]
2x[0] 3x[2]
2x[1] 3x[3]
x[1]
x[0]
...
...
1 x[1]
2x[0] 3x[1] 3x[2] 2x[3]
...
...
...
2x[0] 3x[2]
x[0]
x[0]
0
2
3
3x[3] 2x[1]
x[3]
x[3]
2x[3] 3x[2]
2x[2] 3x[0]
2x[3] 3x[1]
x[2]
x[3]
3x[0] 2x[1] 3x[1] 2x[0] 2x[2] 3x[1] 3x[0] 2x[1]
2x[2] 3x[1]
2x[1] 3x[1]
2x[2] 3x[0]
x[1]
x[2]
2x[2] 3x[1] 3x[0] 2x[1]
2x[2] 3x[0]
x[2]
x[2]
4
5
3x[5] . . .
x[5]
x[5]
x[5]
2x[5] 3x[4]
2x[4] 3x[2]
2x[5] 3x[3]
x[4]
3x[2] 2x[1] 3x[3] 2x[2] 2x[4] 3x[3] 3x[2] 2x[1]
2x[4] 3x[3]
2x[3] 3x[1]
2x[4] 3x[2]
x[3]
x[4]
2x[4] 3x[3] 3x[2] 2x[1]
2x[4] 3x[2]
x[4]
x[4]
21:46
...
...
c[k]
...
...
...
...
06/07/06
b[k]
a[k]
x[k]
k
TABLE 15-1 Polyphase Filter Response
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FIGURE 15-17 A typical filter bank system showing the analysis (left), and synthesis (right) filters.
15.6 FILTER BANKS Multirate systems often appear in the form of filter banks. A filter bank maps an input time-series to a collection of sub-band filters, denoted Hi(z) and Fi(z) in Figure 15-17. The sub-band filters define what are called the analysis and synthesis sections of a filter bank. The individual sub-band analysis filters pass their outputs to individual synthesis sub-band filters. Depending on the choice of Hi(z) and Fi(z), the output can be a copy of the input x[k], which is possibly scaled and/or delayed. Other filter banks will produce only an approximation of the input x[k,], while additional strategies will produce an output that is unrestricted. Many filter bank solutions are justified on the basis of the signal properties existing at the analysis-synthesis section interface. Under certain conditions the data rate across this boundary can be made a fraction of the data rate found at the system’s input or output. If the data rate at the interface level is low, compared to the filter bank’s input and output data rates, then each sub-band filter pair can communicate across a low bandwidth physical channel. This concept is at the core of many bandwidth compression schemes. Quadrature mirror filters (QMFs) filter banks are a popular means of performing subband signal decomposition. The objective of a QMF is often one of compressing the bandwidth requirements for an individual sub band to the point that information can flow through the filter bank across multiple physically band-limited channels. The basic architecture of a two-channel QMF system is shown in Figure 15-18. The two-channel QMF system presents two input-output paths, each having a bandwidth requirement that is half the original bandwidth specification. The top path shown in Figure 15-1 behaves as a lowpass filter, while the bottom path acts as a high-pass filter. The signals found along the top and bottom paths, after decimation, can be expressed in terms of Equation (15-19). Observe that the signals x0[k] (viz: X0[z]) and x1[k] (viz: X1[z]) are decimated by two after being filtered. The signals entering the decimator are H0(z)X(z) and H1(z)X(z), respectively, in
FIGURE 15-18
The basic two-channel QMF filter architecture.
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the z-transform domain. For M 2, the signals leaving the decimator, based on Equation (15-19), are 1 X0(z) 5X(z1/2)H0(z1/2) X(z1/2)H0(z1/2)6 2 1 X1(z) 5X(z1/2)H1(z1/2) X(z1/2)H1(z1/2)6 2
(15-21)
The analysis signals x0[k] and x1[k] are transmitted to the synthesis filter section along two distinct reduced bandwidth channels. The signals are recovered by the synthesis filter section and restored to the original sample rate fs. Upon filtering and interpreting Y0(z2) and Y1(z2), shown in Figure 15-18, it follows that Y(z) can be expressed as Y(z) G0(z)Y0(z2) G1(z)Y1(z2)
(15-22)
The process is graphically interpreted in the frequency domain in Figure 15-19. It can be noted that the output spectrum contains some aliasing contamination which, if left uncorrected, would preclude the reconstruction of an error-free image of the input signal. The source of the aliasing can be traced to the terms shown in Equation (15-23) which is obtained from an expansion of Equation (15-22). 1 1 Y(z) 5(H0(z)G0(z) H1(z)G1(z))X(z)6 5(H0(z)G0(z) H1(z)G1(z))X(z)6 2 2 {alias free terms} {aliased terms} (15-23) What is needed is a process that can suppress the effects of aliasing. Since an ideal (boxcar) filter is physically impractical, other means must be considered. Alias-free performance can be guaranteed if the alias term in Equation (15-23) is set to zero. This can be trivially achieved if G0(z) H1(z) and G1(z) H0(z). However, interpreting the consequence of such an action is challenging. Consider the special alias-free case where H0(z) and H1(z) are sub-band filters satisfying the mirror relationship H1(z) H0(z). In the z-domain, this assignment results in the QMF filter condition Y(z) k :H02(z) H02(z); X(z) T(z)X(z)
(15-24)
where k is a real scale factor. The filter function T(z) can possess several personalities. The most common persona results in possible distortion. The distortion possibilities are classified as ALD (alias distortion), AMD (amplitude distortion), and/or PHD (phase distortion filters). If a filter is ALD, AMD, and PHD-free, the filter is said to possess the perfect reconstruction (PR) property. A PR filter has a transfer function T(z) k zd, which establishes an input-output time-domain relationship given by y[k] k x[k–d]. That is, a PR QMF filter uses sub-channel signal processing to reconstruct an output that is a simple scaled and delayed version of the input. The study of FIRs established the fact that linear phase behavior is often a desired attribute. Suppose it is required to design an Nth–order QMF FIR that is also a linear-phase filter. If N is odd, it can be shown that a null (point of zero gain) will be placed in the output spectrum at the normalized frequency p/2. As a result, an odd order linear-phase FIR can suppress aliasing errors but does not have a flat magnitude frequency response (in
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CHAPTER FIFTEEN
A graphical interpretation of a QMF filter’s spectrum at points along the signal stream.
other words, AMD). If N is even, then the response that is both linear phase and flat is produced only by a trivial two-coefficient FIR having the form H0(z) c0 z2n0 c1z2(n11); H1(z) c0 z2n0 c1z2(n11)
(15-25)
for some integer n0 and n1. Unfortunately, this filter has little value in practice. Any other even order linear phase choice of H0(z) will introduce some distortion. The design of a loworder QMF filter is presented in the next example. Example 15-10 QMF Filter Required:
Show that the trivial even order QMF filter, defined in terms of the Harr basis functions h0[k] [1, 1] and h1[k] [1, 1], results in a linear phase QMF filter.
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FIGURE 15-20
645
A multirate perfect reconstruction example.
Results:
The basic functions h0 [1, 1] and h1 [1, 1] represent 2nd-order FIRs which satisfy the mirror condition H1(z) H0(z). The filter h0 is sometimes called the approximation filter since it smoothes two successive sample values. The filter h1 is called the detail filter since it responds to changes in x[k]. The resulting synthesis filters are given by G0(z) H1(z) H0(z) and G1(z) H0(z) H1(z). From Equation (15-24), it follows that T(z) C H 02(z) H 02(z) D 4z1,
which defines a perfect reconstructed filter whose output is a scaled and delayed version of the input. To illustrate the perfect reconstruction capabilities of the filter bank, refer to Figure 15-20 where the multirate system is partitioned into an analysis section and a synthesis section. Notice that the filter bank consists of decimators, approximation, and detail filters. The output can also be seen to be a perfect reconstruction of the input. Designing a practical high-order QMF can be a challenging process. It is known that there does not exist any nontrivial, or physically meaningful filters having both a flat response and linear-phase performance. As a result, most practical QMF designs represent some sort of compromise. If the linear phase requirement is relaxed, then a magnitude and phase distortion-less alias-free QMF system can be realized. A popular manifestation of this compromise is called the perfect reconstruction QMF (PRQMF) filter. The output of a PRQMF system is equal to the input with a known delay. The design of a PRQMF can follow the recipe shown next. 1. Design a linear phase FIR F(z) as a (2N 1)-order half-band FIR having a ripple deviation d. 2. Classify the zeros of F(z) as being either interior or exterior to the unit circle. Since many of the zeros of F(z) lie on the unit circle, discriminating between an interior or exterior location can become difficult. To mitigate this problem, add a small offset (bias) to the center tap weight of F(z) to form F(z) F(z) qd where q 1.0, but close to unity. This action adds a small bias qd to the frequency response of F(z) across the entire base band. The modified FIR F(z) has zeros that are moved slightly off the unit circle. Biasing F(z) in this manner lifts the zeros off the unit circle and forces them to be either interior of exterior. 3. Define an FIR H(z) formed by all the interior zeros of F(z). 4. Define H0(z) H(z) and H1(z) (1)N1z(N1)H(z1). 5. Define G0(z) H1(z) and G1(z) H(z)
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By relaxing the linear phase constraint, an all-pass PFQMF system is obtained having an input-output transfer function T(z) kz(N1), where k is a constant of proportionality. These principles are illustrated in the following example. Example 15-11 PRQMF Design Required:
The design of a PRQMF system based on a 15th-order (that is, order (2N 1)) linearphase half-band filter having a transfer function F(z) 0.02648z7 0.0441z5 0.0934z3 0.3139z1 0.5 0.3139z1 0.0934z3 0.0441z5 0.02648z7. Results:
The magnitude frequency response of F(z) , F(z) is shown in Figure 15-21. From the half-band FIR, a PRQMF system can be defined using a step-by-step design process, beginning with: Step 1: Step 2: Step 3:
zi 0.939 0.903 0.451 0.439 0.394 0.561 1.167 1.782
F(z) is given and d 0.0238. Let q 1.01 and produce F(z) F(z) qd. The factors of F(z) are (up to the precision of the computing routine) shown next:
j0.398 j0.382 j0.907 j0.884 j0.427
j1.264
Z zi Z 1.02 0.98 1.013 0.987 0.581 0.561 1.72 1.782
Interior/Exterior Exterior Interior Exterior Interior Interior Interior Exterior Exterior
The location of the 14 zeros of F(z) are shown in Figure 15-21. Collecting all the zeros residing interior to the unit circle together results in the creation of H(z). H(z) 1.0 1.34z1 0.68z2 0.24z3 0.34z4 0.099z5 0.239z6 0.17z7
FIGURE 15-21
The magnitude frequency response of F+(z) and its zero distribution.
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FIGURE 15-22
647
Dyadic filter bank architecture.
Step 4: Construct H0(z) and H1(z). H0(z) H(z) H1(z) 0.17 0.24z1 0.099z2 0.34z3 0.24z4 0.68z5 1.34z6 1.0z7 Step 5: Construct G0(z) and G1(z). G0(z) 0.17 0.24z1 0.099z2 0.34z3 0.24z4 0.68z5 1.34z6 1.0z7 G1(z) 1.0 1.34z1 0.68z2 0.24z3 0.34z4 0.099z5 0.24z6 0.17z7
(Note that individually the filters are non-linear phase.) In practice, the two-channel QMF filter displayed in Figure 15-18 can be used to motivate the design of an N 2n channel filter bank having n-levels. The structure of such a filter bank is suggested in Figure 15-22. The architecture is called a dyadic filter bank and the analysis stage filters are H0(z) (Lo) and H1(z) (Hi), while the synthesis stage filters are denoted by G0(z) (Lo) and G1(z) (Hi).
15.7 DFT FILTER BANKS An interesting manifestation of an analysis filter section is called a uniform DFT filter bank, or simply DFT filter bank. A DFT filter bank has a magnitude frequency response suggested in Figure 15-23 which is effectively that of a bank of identically shaped filters that are uniformly distributed across the base band, and located at distinct center frequencies. The nth filter’s response, Hn(z), is defined in terms of a low-pass prototype filter (model) denoted H0, where Hn(z) H0 A WMn z B
(15-26)
for n H [0, M 1]. The complex exponential term WM performs a modulation service required to translate the envelope of the prototype low-pass filter out to a normalized frequency 2pn/M. The frequency response of the nth filter, centered about 2np/M, is given by Hn(ej) H0 A ej(2np/M) B
(15-27)
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H1(z )
H2(z )
H3(z )
0.25π
0.5π Normalized frequency
0.75π
H4(z )
|H(e j ε)|
H0(z )
0
π
FIGURE 15-23 A uniform DFT filter bank magnitude frequency response for M 8. (The frequency axis was normalized with respect to the Nyquist frequency.)
The 0th filter, or prototype low-pass filter H0(z), is assumed to be an N0-order FIR that can be expressed in polyphase form as M1
H0(z) a ziP0i(zM)
(15-28)
i0
From Equation (15-27), it follows that the nth filter in the DFT bank filter satisfies i Mn M Hn(z) a A WMn z B iP0i A WMn z B M a Win M z P0i A WM z B
M1
M1
i0 M1
i0
in i M a WM z P0i(z )
(15-29)
i0
Upon close inspection of Equation (15-29), it can be noted that the equation’s structure is that of a DFT formula (for instance, X[n] gWnkx[k]). What is intriguing is that an M-point DFT can efficiently perform all the modulation (that is, multiplications by WmM) required in the implementation of Equation (15-24). At a system level, the polyphase filter outputs are modulated using an M-sample DFT, as shown in Figure 15-24a. The M-point DFT outputs collectively define a filter bank having the frequency domain response shown in Figure 15-18. The complexity of the DFT filter bank can be analyzed in the context of the complexity of the prototype filter and DFT. Consider that the
FIGURE 15-24
A DFT filter bank and DFT filter bank with decimators.
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FIGURE 15-25
649
A DFT filter bank frequency and impulse responses for M 2.
prototype FIR filter, H0(z), is defined to be of order N0 NM filter. Referring to Figure 15-24a, it can be seen that there are M polyphase FIRs, each polyphase filter being of order N. The polyphase filter portion of a DFT filter bank solution would therefore require N0 MN multiplies per filter cycle distributed across M filters. By adding decimation by M circuits, shown in Figure 15.24b, the real-time complexity can be further reduced by a factor of 1/M. The multiplicative complexity of an M-point DFT can, in practice, be made small and often on the order of M log2(M ) if an FFT is used to perform the modulation. As a result, a DFT filter bank can be computationally efficient. Furthermore, a high-quality filter bank can be created if the design is based on a welldefined prototype FIR filter H0(z). The design of a low order DFT filter bank is considered in the next example. Example 15-12 DFT Filter Bank Required:
Design and analyze a DFT filter bank for M 2 using a prototype filter H0(z) 2 3z1 3z2 2z3. Results:
The polyphase representation of H0(z) is H0(z) P00(z2) z1P01(z2), where P00(z) 2 3z1 and P00(z) 3 2z1. Equations (15-29) states that for W02 1 and W1 2 1: 1
H0(z) a ziP0i(z2) P00(z2) z1P01(z2) 2 3z1 3z2 2z3 i0 1
i 2 2 1 2 1 H1(z) a Wi 3z2 2z3 2 z P0i(z ) P00(z ) z P01(z ) 2 3z
i0
The DFT filter bank is presented in Figure 15-25 and is seen to consist of a pair of polyphase filters and a two-point DFT. The impulse response of the DFT filter bank, measured along the top path is {2, 3, 3, 2}, which corresponds to h0[k]. The impulse response measured along the bottom path is {2, 3, 3, 2}, which corresponds to h1[k].
15.8 CASCADE INTEGRATOR COMB (CIC) FILTER Wireless and LAN communication systems transmit signals, information rates, and frequencies often beyond those which admit digital processing (for example, 5 GHz). Intermediate frequency (IF) stages are used to reduce signal frequencies to a point that can
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be accepted by an ADC (for example, 100 MSa/s). The information spectra, however, can be far less than the ADC bandwidth (for example, 100 kHz). For narrow-band communication applications, the channel bandwidth is much lower than the first ADC rate ( fbandwidth /fs V 11). For broadband applications, the difference in bandwidth requirements can be less than 10. Nevertheless, the signal sampled by the ADC must be down-converted to a base-band signal before it can be analyzed by a “back-end” processor. This is normally accomplished by mixing the digitized signal with a synthesized sinusoid (sine and cosine) obtained from a direct digital synthesizer or DDS. Using this process, the desired information channel is heterodyned down to DC. Once at DC, a frequency selective filter is used to isolate the information channel of interest from a broadband spectrum. The required down conversion must, however, be performed at high real-time data rates which will normally preclude the use of a common FIR to extract the desired information process from the ADC output. A fast simple solution is needed. Such a solution is called a digital down converter, or channelizer. The preferred channelizer architecture is called a cascaded integrator-comb (CIC), or Hogenauer filter. In order to be able to sustain high real-time speeds, multiplier-free filter structures are needed. A moving average (MA) filter, having an impulse response and transfer function: h(n) e
if 0 n N 1 otherwise
1 0
N1
HMA(z) a z
i
i0
(1 zN) (1 z1)
(15-30)
is a frequency selective multiplier-free FIR. The magnitude frequency response of a MA FIR has a sin(x)/x envelope. The MA’s bandwidth is established by the filter order. In concept, an MA filter can be used to extract a narrow band of information heterodyned down to DC by a DDS. For narrow-band applications, the information bandwidth can be 1/1000th the sample frequency, requiring an MA filter having a very narrow passband and therefore a high order. The problem with a high-order MA filter design is the high shift register count. A CIC filter, abstracted in Figure 15-26, provides an efficient means of implementing a high order MA filter. Each of the N comb filters is clocked at a decimated rate of fc fs /R. This effectively defines each comb register delay to be R times longer than an integrator’s register delay. Therefore, the N cascaded comb filters have a transfer function given by HC (z) (1 zR )N which exhibits zeros distributed along the unit circle at locations z e j2pk/R, kH[0, R). When the Nth-order comb is cascaded with an Nth-order integrator, a CIC filter results, having a transfer function: HCIC(z) (1 zR)N/(1 z1)N.
FIGURE 15-26
(15-31)
A CIC filter architecture.
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FIGURE 15-27
651
Basic CIC filter performance along with a post-processing frequency shaping FIR filter.
The CIC filter defined in Equation (15-31) is equivalent to an RN-order filter. The N poles of the integrator at z 1 are cancelled by the N zeros of the comb filter, also at z 1, resulting in high DC gain and a sin(x)/x roll-off in the side bands. The filter has a maximum gain defined at DC, and is equal to HCIC(z)max Gmax R N. For typical narrow-band applications, having R 1024 and N 5, Gmax (210)5 250. This suggests that CIC filters have potentially high internal gains. Finally, the sin(x)/x CIC response is often post-processed using a low-pass shaping FIR to define the final output spectrum, as suggested in Figure 15-27.
15.9 FREQUENCY MASKING FILTERS There are instances when a steep skirt (in other words, a narrow transition band) filter is required. Unfortunately, steep skirt fixed-sample rate filters are historically very complex and of high order. Such filters can, however, be designed using multirate techniques based on the frequency masking method. The frequency masking method uses what are called compressed filters. A compressed by M version of a prototype FIR H(z) is denoted H(z) H(zM) and can be realized by replacing each single clock delay in H(z) with an M sample delay. The compressed filter H(z) continues to be clocked at the original sample rate fs.2 Referring to Figure 15-28, observe how compression scales the frequency axis by a factor 1/M and, as a consequence, compresses the FIR’s original transition bandwidth by a like amount. It can also be observed that the act of compression populates the base-band spectrum with multiple copies, or artifacts, of the compressed prototype filter’s frequency response. The center frequencies for these artifacts are located at k /s k/M. It is through the intelligent use of compression that steep-skirt filters can be realized. The frequency-masked FIR architecture is presented in Figure 15-28 and consists of the following definable subsystems: • • • • •
H1(z), a compressed by M1 version of an N1-order FIR H1(z) H2(z), the compressed by M2 version of the complement of H1(z) H3(z), the compressed by M3 version of an N3-order FIR H3(z) H4(z), the compressed by M4 version of an N4-order FIR H4(z) H5(z), an N5-order FIR
2 The compressed filter is not an interpolation FIR. An interpolated FIR operates at an elevated sample rate of fM M fs, a compressed filter operates at a rate fs.
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FIGURE 15-28 The magnitude frequency response of compressed by M 4 FIRs showing the critical frequencies of p 0.2 and a1 0.3 being mapped (compressed) to 0.2/4 0.05 and 0.3/4 5 0.075. The transition bandwidth is scaled from 0.1 to /M 0.025. In addition, multiple copies of the compressed spectra are distributed uniformly along the base-band frequency axis.
The compression factor M1 is chosen in order to map the transition bandwidth of 1 to the final transition bandwidth of 1/M1 V 1. The target filter’s low-pass cutoff frequency p needs to be made coincident with one of the critical frequencies of a compressed filter H1(z) (for example, K 1p1/M 1, as shown in Figure 15-28) or the compressed complement filter H2(z). Notice that the passband trailing edge for the first (K 0) compressed image is located at p1/4 0.05 and for the second image (K 1), 4p1/4 0.3. These relationships for the compressed and compressed complement filters are summarized next: /s e
(Ks p1)/sM1; H1(z)–based ((K 1)(s/2) vp1)/sM1; H2(z)–based
(15-32)
The stopband critical frequencies can be likewise determined, and are a function of M1 and the original stopband frequency of H1(z) or a passband of the complement filter H2(z). Once the compressed or complement compressed critical frequency is chosen, a housekeeping need appears. The compressed artifacts generated by the compressed prototype and compressed complement prototype filters extending beyond the target filter’s passband frequency need to be eliminated. This is the role of the frequency-masking filters H3(z) and H4(z). The optional last-stage shaping FIR H5(z), shown in Figure 15-29, provides a final level of artifact suppression. These rules that codified the design of a frequency masking filter are shown next. • The component FIR filters H1(z), H2(z), H3(z), H4(z), and H3(z) should be designed to have their transition bands somewhere in the middle of the base-band range f H [0, fs /2). This will ensure that no unusual passband or stopband widths are imposed on the component filters. • The filter H1(z), or its complement, must have a critical passband frequency vp that maps to the target passband frequency for a compression of M1 and a copy index K.
FIGURE 15-29
The anatomy of a frequency-masked (steep skirt) FIR.
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• The design should minimize the solution’s transition bandwidth, which is given by g min b
1 1 1 1 1 1 , r H1(z) H3(z) H5(z) H4(z) H4(z) H5(z) ^
^
^
^
^
(15-33)
^
which corresponds to the estimated bandwidths of the upper and lower paths. The value of g can be reduced if all the compressed filters have similar transition bandwidths. For the case where the component filters are of differing orders (Ni) and transition bandwidths ( i), then it should be designed so that all the values of Ni i are similar. As a rule, the highest order FIR section in a frequency-masked system is generally H1(z) (therefore H2(z)), followed by H3(z), H4(z), and finally H5(z). This suggests that their individual uncompressed transition bandwidths should appear in the reverse order. For linear phase solutions, the group delay of the upper and lower paths need to be the same. If N4 N3, then filter H4(z) will need to be equipped with an additional (N4 N3)/2 shift register delay in order to equalize the group delays of the upper and lower paths. Finally, as a general rule, the passband deviation of each filter can be chosen to be 25–33 percent of the target deviation, in order to account for the degradation (increase) in passband ripple due to cascading. An example of the design process associated with a steep-skirt FIR is presented in the next example. Example 15-13 Steep-skirt FIR Design Required:
Design a steep-skirt FIR low-pass filter having the following specifications: • A passband defined over f H [0.0, 0.1] fs (in other words, p 0.1) with a maximum deviation of 0.175 dB from 0 dB • Stopband defined over f H [0.1025,0.5] fs (or a 0.1025) with a gain of 40 dB or less • A transition bandwidth of (0.1025 0.1)fs (0.0025)fs. Results:
It is worth noting that satisfying the specifications would require a linear-phase equiripple filter having an order in excess of 700. This is, in most instances, unacceptable. The design of a steep-skirt filter begins with a definition of the prototype H1(z) in terms of the critical design parameters (p1, a1, 1), compression ratio (M1), and replication constant (K1). Since the target normalized transition bandwidth satisfies 0.0025 1/M1, a list of acceptable 1 and M1 pairs can be assembled using a direct computer search. A reasonable, but by no means unique choice is M1 17, resulting in 1 0.0428. Next, for M1 17, the targeted passband cutoff frequency needs to be expressed in terms of the compression filter parameters ps or a1, and K1 (these parameters also apply to the compressed complement filter as well.) Again, a direct computer search can be used to sort out the parametric options, as illustrated in Figure 15-30. Figure 15-30 reports the outcome if p 0.1, p1 0.2573, a1 0.3, K 2, and M 17. That is, the target passband frequency is obtained by compressing the complement filter H2(z) and K 2. Finally, the passband gains of the component filters need to be specified. Suppose the minimum passband gain for the upper path is Gupper G1G3G5, and Glower G2G4G5 for the lower path. Assume, for the purpose of discussion, that all individual gains are comparable such that Gupper , G13 and Glower , G13. Since the specified minimum pass band gain is on the order of 0.175 dB, it follows that Gupper Glower 0.98, or the gain deviation is (1 0.98) 0.02 , 34 dB. For design consistency, let the passband deviation of all the filters (in other words, G1, . . . , G5) be essentially the same. Then if Gupper Glower 0.98 G13, G1 0.9933 or the passband deviation is on the order of
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FIGURE 15-30 Frequency-masked design example for p 0.1, M 17, K 2, p1 0.2573, and a1 0.3. The final design retains two copies (K 2) of the compressed prototype spectrum and two copies (K 2) of the compressed complement response.
1 0.9933 0.0067 , 43 dB. The minimum stopband attenuation is essentially set by the stopband attenuation of filter H5(z) if K3 and/or K4 is greater than unity. In such instances, the filters H3(z) and/or H4(z) will spawn spectral artifacts that are outside the final solution’s passband, which are suppressed by H5(z). The frequency-masking filter process is summarized in Table 15-2. All component filters are equiripple FIRs with critical frequencies pi and ai, as described next. The behavior of the filter H2(z) is established by H1(z). The filters are generally designed to have a passband deviation on the order of 40 dB and a value of Nii , 2.8. The
TABLE 15-2 Frequency Masked Filter Item Passband edge (pi) Stopband edge (ai) Passband ripple (dpi) Stopband ripple (dai) Filter order Ni Transition bandwidth i Nii Compression factor Mi
H1(z)
H2(z)
H3(z)
H4(z)
H5(z)
0.257200 0.300000 43 dB 56 dB 63 0.0428 2.8676 17
0.300000 0.257200 56 dB 43 dB 63 0.0428 2.8676 17
0.229412 0.307500 45 dB 58 dB 37 0.0781 2.8897 3
0.300000 0.398382 58 dB 71 dB 37 0.0984 3.64 3
0.100000 0.200599 42 dB 42 dB 23 0.1006 2.438 1
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exception is the 37th-order H4(z) (same order as H3(z)), where N44 , 3.6. A 29thorder H4(z) could have been used, resulting in a N44 , 2.85 if eight additional delays (four pre-delays, four post-delays) are added to equalize the group delays. Choosing a 37th-order FIR over a 29th-order FIR will simply result in the lower path having a slightly different gain deviation. Figure 15-31 reports the spectral response of the complete 160th-order solution (note: H2(z) is assumed to be implemented as a delay-enabled complement FIR requiring no additional coefficient multipliers). The design is based on a compressed critical frequency obtained from H2(z) (a1 0.3 is compressed to p 0.1). It can also be seen that the filters H3(z) and H4(z) pass the first K1 2 copies of H1(z) and
FIGURE 15-31 From top to bottom are shown the uncompressed component filter responses, compressed component filter responses, the composite filter response before the application of the housekeeping filter H5, and the final filter response including the effect of filter H5.
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H2(z), respectively. The estimated transition bandwidths of the upper and lower paths are 1 1 1 1 1 1 1 1 0.0428/17 0.0781/3 0.1006 0.0216 upper H1 H3 H5 ^
^
^
1 1 1 1 1 1 1 1 0.0428/17 0.0984/3 0.0230 0.1006 lower H2 H4 H5 ^
^
^
which results in a value of steep-skirt 0.0023 0.0025. The resulting steep-skirt linear phase FIR is analyzed in Figure 15-31, and quantitatively as • • • •
Passband edge: Stopband edge: Passband ripple: Stopband ripple:
0.1fs 0.1025fs 0.1 dB 42 dB
which are seen to meet or exceed the design specifications.
15.10 MATLAB MULTIRATE SUPPORT Mathwork’s Signal Processing Toolbox contains a set of basic tools that support multirate system simulation and analysis. They include • • • • • •
decimate downsample interp resample upfirdn upsample
Some of these functions contain embedded filters; others simply implement basic decimation and interpolation operations. These methods are abstracted in the following: decimate: Decimation reduces the original sampling rate for a sequence to a lower rate. The decimation program filters the input data with an nth-order low-pass filter and then resamples the resulting smoothed signal at a lower rate (see Figure 15-32). Example: Decimate a signal by a factor of four. t = 0:.00025:1; x = sin(2*pi*30*t) + sin(2*pi*60*t); y = decimate(x,4); downsample: Downsample decreases the sampling rate of a signal x[k] using an integer factor by keeping every nth sample starting with the first sample. interp: Interp increases the original sampling rate by an integer factor. Program interp performs low-pass interpolation by inserting zeros into the original sequence and then applying a low-pass filter to smooth the data (see Figure 15-33).
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FIGURE 15-32
657
MATLAB decimation.
Example: Interpolate a signal by a factor of four: t = 0:0.001:1; % Time vector x = sin(2*pi*30*t) + sin(2*pi*60*t); y = interp(x,4); resample: Resample changes a signal’s x[k] sample rate by a rational factor p/q using a polyphase filter implementation. The parameters p and q must be positive integers. The length of the re-sampled signal is equal to [length(x) p/q)]. Resample applies an antialiasing (low-pass) FIR filter to the signal during the re-sampling process (see Figure 15-34). Example: Resample a simple linear sequence at 3/2 the original rate: fs1 = 10;
% original sampling frequency in Hz
t1 = 0:1/fs1:1;
% time vector
x = t1;
% define a linear sequence
y = resample(x,3,2); % resample
FIGURE 15-33
The MATLAB interpolation.
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FIGURE 15-34 conversion).
A MATLAB re-sampling (sample rate
upfirdn: Program upfirdn performs a cascade of three sequential operations beginning with up-sampling the input signal by a factor p (inserting zeros), then FIR filtering the up-sampled signal, and finally down-sampling the result by a factor of the integer q. Example: Change the sampling rate by a factor of 147/160 (corresponds to a 48 kHz (DAT rate) to 44.1 kHz (CD rate)) L 147; M 160; % Interpolation/decimation factors. N 24*M; h fir1(N,1/M,kaiser(N 1,7.8562)); h L*h; % Passband gain L Fs 48e3; % Original sampling frequency: 48 kHz n 0:10239; % 10240 samples, 0.213 seconds long x sin(2*pi*1e3/Fs*n); % Original signal, sinusoid at 1 kHz y upfirdn(x,h,L,M); % 9408 samples, still 0.213 seconds upsample: Upsample increases the sampling rate of a signal by an integer factor via inserting n 1 zeros between samples. Example: Increase the sampling rate of a sequence by 3: x = [1 2 3 4]; y = upsample(x,3);
BIBLIOGRAPHY Cavicchi, T. Digital Signal Processing. New York: John Wiley and Sons, 2000. Chassaing, R. Digital Signal Processing and Applications with the C6713 and C6416 DSK. New York: John Wiley and Sons, 2005.
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Harris, F. Multirate Signal Processing for Communications Systems. Englewood Cliffs, New York: Prentice-Hall, 2004. Ifwachor, E., and B. Jervis. Digital Signal Processing 2nd ed., San Francisco: Addison Wesley, 2001. Mitra, S. Digital Signal Processing, 3rd ed. New York: McGraw-Hill, 2006. Oppenheim, A. V., and R. Schafer. Digital Signal Processing. Englewood Cliffs, New York: PrenticeHall, 1975. ———. Digital Signal Processing 2 ed. Englewood Cliffs, New York: Prentice-Hall, 1999. Suter, B. Multirate and Wavelet Signal Processing. Lighting Source, 1998. Taylor, F. J. Digital Filter Design Handbook. New York: Marcel Dekker, 1983. ——— and T. Stouraitis. Digital Filter Design Using the IBP PC. New York: Marcel Dekker, 1987. ——— and Mellott, J. Hands-On Digital Signal Processing. New York: McGraw-Hill, 1998. Vaidyanathan, P. P. Multirate Systems and Filter Banks. Englewood Cliffs, New York: Prentice Hall, 1993.
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16.1 INTRODUCTION TO SIGNAL PROCESSING DSP, at one level or another, is technology-driven. A DSP technology roadmap was established in the early 1970s using the definition of what was to become the DSP microprocessor or DSP p.1 Beginning in the late 1970s, the first generation of DSP p (that is, Intel 2920) made a commercial appearance. Since then, DSP has become a unique and valuable fusion of science, mathematics, and technology. While there have been significant theoretical and algorithmic advancements made to the field over the past three decades (for example, Cooley-Tukey FFT, 1975), technology has been the real engine for DSP growth. Today, the principal beneficiary of the DSP revolution is communications (for example, cellular telephony) followed by consumer electronics and computers. Communications applications are generally well articulated (such as a digital down converter), leading to the creation of high-performance compact wireless and network systems. DSP is also leading the march towards software-defined radio (SDR), enables new services such as satellite radio (for example, XM Radio and Sirius Radio), and a host of terrestrial innovations (high definition or HD Radio). The impact of DSP on consumer electronics is casedependent. The value of DSP in such applications as MP3 for audio players, JPEG for digital cameras, and MPEG for DVD players cannot be challenged. DSP is also a critical computer technology in the form of disk controllers, multimedia, and image and video processing. Other areas having an obvious DSP content are biomedicine, transportation, and defense, just to name a few. It is apparent that the future of this field is intimately tied to semiconductor innovations and man’s ingenuity. Gordon E. Moore, co-founder of Intel, has provided a means of predicting the future in terms of Moore’s Law, which was expressed as: (Nt>A)(t1) (Nt>A)(t0) 1.58(t1t0)
(16.1)
where (Nt/A)(t) denotes the number of transistors normalized by area at some point in time. Moore’s empirical formula predicts the doubling of transistor density every 18 months. For decades, Moore’s Law has been on target, in lock step with improvements in semiconductor lithography that enabled smaller scale sizes, which in turn resulted in • Decreased power dissipated per transistor (P CV 2 f leakage) • Lower cost, increasingly complex chips
1
U.S. Patent 3,812,470; Programmable Digital Signal Processor, John C. Murtha et al. (Westinghouse), 1974.
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TABLE 16-1 Interpretation of Moore’s Law Item
Circa 1972
Circa 2002
CPU speed
6 MHz
600 MHz
100
Memory
128 KB
256 MB
2,000
Memory access time
850 ns
100 ns
8.5
3 Mbps (Ethernet)
100 Mbps (Ethernet)
30
2.5 MB
100 GB
2,400
Network Disk capacity
Factor
Moore’s Law can be illustrated in terms of semiconductor memory, noting that • Memory capacity has improved 1,000,000-fold since 1970 • Memory bandwidth has improved 100-fold since 1970 • Memory latency had been reduced 10-fold since 1970 While transistor density has been exponentially increasing, bandwidth and latency are seen to lag. Moore’s Law applied to processors suggests that more complex multiprocessor chips, using one or more processors to perform a single function (for example, in graphics), will be commonplace. Moving data to and from the processor will, unfortunately, remain problematic. Further insights can be drawn from a side-by-side comparison of two general-purpose digital machines configured in Table 16-1. The first system is defined at the time the Intel 8080 microprocessor was introduced. The second machine is more recent. Based on this model, the future can be seen to be potentially amazing. There are apparently only two limits on where future digital technologies will take man. The first is the loss of man’s creative instincts. The second is that man is approaching the physical technological limits predicted by semiconductor physics. It has turned out that atoms are too big and that light is too slow to meet our future needs.
16.2 PROCESSOR FORMS One of the principle driving forces of the digital revolution has been processor technology. The form and function of digital processors can vary widely and are often differentiated by their semiconductor technology expression and intended application. Specifically, they can be classified as • • • • • •
General-purpose ps chips or cores DSP p floating-point chips or cores DSP p fixed-point chips or cores Field programmable gate arrays (FPGAs) Function-specific integrated circuits Application-specific integrated circuits (ASICs)
Chips are self-contained entities that are placed onto printed circuit boards (PCBs) and used to define system-level solutions. Cores are semiconductor designs supplied as software statements (RTL, VHDL, targeted net lists) that can be embedded into a chip design, enhancing the outcome’s functionality.
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General-purpose processors have a long history of use in implementing DSP algorithms. Some of the processors have evolved DSP-friendly instruction sets and are often released as embeddable processor cores. Due to their high internal clock rate and superscalar architecture, general-purpose processors can often become credible DSP engines (for example, Intel Pentium with MMX extensions). Their disadvantage is cost, power dissipation, execution time variability, and a lack of DSP-intensive instructions. DSP ps have been continuously refined since their initial entry into the marketplace. It is often assumed DSP ps are the majority technology in DSP applications, but this would be false. Nevertheless, DSP ps are powerful agents, often executing instructions in parallel using an optimized DSP instruction set. They can exhibit superscalar capabilities and some are based on a very long instruction word (VLIW) architecture that issues multiple instructions per instruction cycle. Function-specific integrated circuits, sometimes called application-specific standard parts (ASSP), are single-chip devices that serve high-valued, high-volume needs and are intended for mass resale. Examples are digital down converters, JPEG decoders, and so forth. These devices are often implemented using what is called standard cell and cellbased design strategies. Application-specific integrated-circuits (ASIC) often provide the services associated with an ASSP, but are technically intended for internal product use. The boundary between ASSPs and ASICs has blurred over time, resulting in both classes often being referred to as ASICs. Structured ASICs, also called platform ASICs, are based on a mask layer that is partially predefined by the ASIC provider. Structured ASICs can provide high-performance approaching that of a custom chip without the excessive high nonrecurring expenditures (NRE) associated with a custom design. Nevertheless, the NRE costs can be considerable. Compared to custom designs, a structured/platform ASIC can reduce the time-to-market by a significant amount. Together, ASIC/ASSPs are the dominant DSP technology. The future of this class of technology is strongly tied to the utilization of reusable intellectual property (IP) to define important core functions (for instance, FFT). FPGAs are members of a class of devices called programmable logic. The major advantage of FPGAs is their design flexibility and ability to prototype complex solutions. Design changes can be made quickly and often remotely. However, FPGA flexibility is purchased at the expense of the device’s footprint, power consumption, and unit cost. FPGAs have a growing presence in mainstream DSP as a rapid prototyping technology and in developing few-of-a-kind solutions. FPGAs have been shown to be a viable digital filter technology, especially in those cases where a filter can be implemented using distributed arithmetic. More recently, FPGA architectures have been developed and marketed that contain arrays of embedded multiply-accumulators, providing a more general-purpose capability at an elevated cost per part. In the life cycle of virtually every hardware-orchestrated DSP design there is a point where the implementation technology needs to be critically accessed. The choice is influenced by many factors beyond cost and performance. Comparing an ASIC to an FPGA design, for example, is heavily predicated on market size as suggested in Figure 16-1 where the cross-over point is assumed to be 1,000 units.
FIGURE 16-1
The economics of FPGA versus ASIC designs.
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Another concept gaining increased attention is the notion of a system-on-a-chip (SOC) solution. The ability to concentrate the majority of processor elements and communication functions on a single chip provides a wealth of operational and economic advantages. DSP solutions are also making increased use of intellectual property (IP) in the form of predefined partial solutions. IP providers create partial solutions that can be used to assemble more complex solutions (for example, ARM10, FFT). IP provides a pathway that can mitigate time-to-market pressures and facilitate the realization of solutions of increasing complexity. IP is generally delivered as licensed RTL or VHDL/Verilog code, or net lists, that define solution elements. IP can be classified as hard cores (being fixed optimized designs), soft cores that provide only a device’s functional description, or firm cores that are a blend of hard and soft cores.
16.3 GENERAL-PURPOSE MICROPROCESSORS (ps) To more fully understand the deviating paths taken by DSP technologists in the quest of the perfect processor, their underlying technical philosophies and strategies need to be understood. These issues were presented by Taylor and Mellott2 in a general context which motivates the discussion found in the next few sections. The study begins with stating the expected attributes and liabilities of a general-purpose processor and DSP processor. Features found on most general-purpose processors (not inclusive) include • • • • • • • •
Multiple data types supported by the processor hardware Multilevel cache memories Paged virtual memory management in hardware Support for hardware context management including supervisor and user modes Unpredictable instruction execution timing Large general-purpose register files Orthogonal instruction sets Simple or complex memory addressing, depending upon whether the processor is RISC or CISC
The most important data types employed by general-purpose processors are character types, followed by the integer types. From the viewpoint of market share, the majority of general-purpose processors are employed in business applications that involve text and database processing. Floating-point arithmetic is generally not crucial in most applications run on general-purpose computers, although there are niche markets where this is not true (for example, technical and scientific workstations). Cache memories have been demonstrated to be a powerful enhancement agent for many general-purpose processors. The inclusion of sometimes substantial-sized cache memories in general-purpose computers are based on the assumption that application programs demonstrate instruction or data locality, sometimes called the “cache assumption.” The cache assumption is frequently used to justify the design of shared memory multiprocessing general-purpose computers where the main memory is connected to the processors via a shared bus. If the cache assumption is violated, the performance of single and multiprocessing general-purpose computers is generally degraded.
2
F. Taylor and J. Mellott. Hands-On Digital Signal Processing. New York: McGraw-Hill, 1998.
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Large register files are included in many general-purpose architectures, although there are exceptions (for example, Intel x86). Since most general-purpose machines operate on scalar data, and if the cache assumption holds, large register files are generally beneficial. General-purpose registers and orthogonal instruction sets tend to enable compilers to produce efficient object and assembly language code. Since external memory can only be accessed by load and store operations, it is desirable to keep more operands on hand in the register file to enhance performance. As a result, the load-store architectures used in many RISC processors are enhanced through the use of large register files. Hardware support for the management of virtual memory and multiple process contexts is desirable in general-purpose computers. Most general-purpose processors support the timeshared execution of multiple processes; even single-user desktop computers are generally running many processes in the background. Virtual memory allows programs to run in a degraded manner if their primary memory requirements exceed available resources. The penalty for virtual memory is increased data access latency due to address translation penalties and long page-fault latencies. The latter is generally managed by switching the processor context to another process so that the processor does not idle while a page fault is being serviced. Support for multiple process contexts by a general-purpose computer is therefore crucial for optimal utilization of the processor resource among multiple tasks. Instruction execution timing on general-purpose processors is generally unpredictable. This is the result of myriad features designed to enhance the general performance of the processor. Cache memory and virtual memory introduce a substantial amount of uncertainty in instruction execution timing. The amount of time required to read or write a particular location in memory will depend upon whether or not a cache “hit” occurs, at which level of the cache it hits, and whether or not that virtual address resides in the table lookaside buffer (TLB). Main memory latency can be affected when a cache fault occurs and the cache needs to be refreshed. Also, variable latencies occur when other processors, like direct memory access (DMA), cause access contention problems. Various architectural enhancements, such as superscalar execution, speculative execution, out-of-order execution, and branch target caches, may further confound any attempt to measure the execution time of an instruction. Another class of general-purpose processor commonly encountered is the microcontroller. Most microcontrollers are derived from successful general-purpose microprocessor designs, although some are original designs. Microcontrollers are typically targeted at embedded applications which typically do not require significant arithmetic performance. Microcontrollers usually eliminate features such as large cache memories and virtual memory, and instead, add integrated peripheral interfaces to support the intended embedded applications.
16.4 DSP PROCESSOR (DSP p) Since the 1970s, the semiconductor industry has experienced geometric growth in the number of transistors that can be placed on a chip. One of the principal beneficiaries of this high-density, deep submicron capability is DSP. For example, the Texas Instruments TMS320 family of DSP ps has logically migrated from its original fixed-point versions (TMS320C10) to today’s vast collection of floating-point and VLIW multiprocessor devices. All these solutions are based on the use of dominating MAC operations used to form sums of products over the real or complex field (for example, convolution, correlation, and transforms). A variation on the basic MAC call is the vector SAXPY (Scalar AX Plus Y) operation. SAXPY algorithms range from linear to non-linear, in 1-D to M-D configurations.
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General-purpose processors have often exhibited a Von Neumann architecture. Von Neumann architectures are defined in terms of a single block of memory, as illustrated in Figure 16-2. Von Neumann machines were extremely popular, enabling many important general-purpose computing innovations and commercially successful systems. The early days of computing, however, were dominated by machines having a so-called Harvard architecture. DSP processor designers have been rediscovering this design paradigm in increasing numbers. Machines employing Harvard architectures have dedicated buses serving various parts of the system (for example, memory bus, instruction bus, I/O bus, and so on), as shown in Figure 16-2. The designers of DSP processors realized that a Harvard architecture was synergistic to highly repetitive multiply-accumulate (MAC) DSP algorithms. It was found that such operations could be accelerated using Harvard architectures along with direct memory access (DMA) support. More recent interpretations of the Harvard architecture introduced additional layers of instruction cache and high-bandwidth I/O ports to data memory paths, as suggested in Figure 16-2. While DSP architectures are varied, more often than not they are differentiated by the market they attempt to serve. Regardless of the details, DSP processors are expected to exhibit the following characteristics: • High-arithmetic performance often involving extended precision multipliers and arithmetic units • One or two data types being supported by the processor hardware • Limited data cache memory • No memory management hardware • No support for hardware context management (task switching) • Exposed pipelines • Predictable instruction execution timing • Limited register files, instead providing special purpose registers
FIGURE 16-2
Architectural choices.
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• Non-orthogonal instruction sets • Enhanced memory addressing modes • On-board fast RAM, ROM, and DMA DSP signal processors are designed around a different set of assumptions than those which drive the design of general-purpose processors. First, digital signal processors generally operate on arrays of data rather than scalars; therefore, the scalar load-store architectures found in general-purpose RISCs are not essential. The economics of software development for digital signal processors is also different from that for general-purpose applications. Digital signal processing problems tend to be algorithmically smaller than, for example, a word processor. In many cases, the ability to use a slower and less expensive digital signal processor by expending some additional software engineering effort is economically attractive: a good return-on-investment may be achieved even if a few dollars per unit of manufacturing cost can be saved in a product that will ship a million units. This fact is often reflected in serious design optimization efforts associated with DSP solutions. As a consequence, the most serious programming of digital signal processors is done in assembly language rather than high-level languages (HLL), although working with high-level languages is becoming increasingly popular.
16.5 DSP ADDRESSING MODES Modern general-purpose processors can have many addressing modes (such as CISC processors) or few addressing modes (for instance, RISC processors). CISC processors can support addressing modes such as direct, register or memory indirect, indirect indexed, indirect with displacement, and indirect indexed with displacement. Furthermore, the indexed modes may support pre- and post-increment or decrement of the indices. Historically, complex addressing modes have resulted in higher code entropy which has two consequences. First, the productivity of the assembly language programmer is enhanced, and second, the resulting object code is more compact. A number of factors have contributed to the disappearance of complex addressing modes characteristic of CISC processors. The first is the change in the economics of hardware costs versus software development costs. Decades ago, software development was less costly and required investment in hardware. Handcrafted assembly-level language code was commonly used to create application programs. Today, hardware is inexpensive relative to software development costs. Furthermore, contemporary time-to-market pressures are altering this landscape. As a result, most applications are coded using high-level languages. Another issue is related to the first. It has proven difficult to get compilers to take full advantage of complicated addressing modes and nonorthogonal instruction sets. Another strike against complex addressing modes in general-purpose computers is that the complex addressing modes tend to cause pipeline stalls, due to the complicated data interdependencies produced by the complex addressing modes. Even modern CISC implementations have been optimized so that better performance results when complex addressing modes are avoided. Eschewing complex addressing modes has led to the adoption of a load-store philosophy that allows functional units to accept issues without stalling due to data dependencies associated with data stored in memory. By moving to register indirect load-store architecture, all of the more complex addressing operations are performed in software, thus allowing greater flexibility in scheduling instruction issues. A register indirect load-store architecture synthesizes more complicated “addressing modes” with several simple instructions. The compiler is free to statically arrange these instructions with an awareness of the impact of adjacent instructions on the scheduling of processor resources. The processor may also elect to rearrange the execution
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of these simple instructions within the constraints of available resources and data dependencies. In contrast, the classic CISC has the micro-operations of each instruction statically scheduled in the micro-program for each instruction. DSP applications frequently require non-sequential access to data arrays using modular or bit-reversed addressing. These addressing modes are not easily supported in generalpurpose RISC or CISC processors. For maximum performance in digital signal processing applications, it is sensible to add dedicated hardware support for these addressing modes. To summarize, the addressing modes required include • Address register indirect • Address register indirect with unit stride and non-unit stride modular indexing • Address register indirect with bit-reversed indexing Existing DSP architectures are single-issue so, with the exception of the special modes indicated, the address register file and arithmetic unit would be similar to that found in general-purpose architectures. In order to support multiple issues, it will be necessary to define either a hardware or software mechanism to support concurrent address generation for multiple function units.
16.6 CIRCULAR BUFFERING The nature of DSP algorithms suggests that DSP processors are expected to perform SAXPY-type operations frequently and efficiently. These operations often involve the pairwise multiplicative combination of a variable and filter coefficient. Both sample data and coefficients can be viewed as being read from a circular buffer, as shown in Figure 16-3. The data is accessed by a pointer that indicates which data value is to be read from the buffer at a specific point in the program’s execution. Modern DSP ps efficiently implement these buffers as well as provide a means to read and write data to the buffer and expel data that is no longer needed. The use of a circular buffer in implementing an Lth-order FIR is illustrated using the following pseudo-code. MOVE {current sample to circular data buffer} UPDATE {update pointers to the circular data buffer} CLEAR {zero accumulator} BEGIN {begin FIR loop} READ {read FIR coefficient from circular coefficient buffer} UPDATE {update pointers to the circular coefficient buffer} READ {read data from circular data buffer}
FIGURE 16-3
A circular buffer.
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UPDATE {update pointers to the circular data buffer} MULTIPLY {multiply data and coefficient} ADD {send result to the accumulator} END {end loop} MOVE {move output result to destination} REPEAT {repeat the process for the next input sample}
16.7 DSP PROCESSOR FEATURES Execution time in DSP applications is normally dominated by sum-of-product (SOP) operations. Typical examples are computing inner products and linear convolutions. These operations are based on a sequence of multiply-accumulates that can be implemented using a simple computing loop. It is therefore reasonable to provide instruction set support for executing a loop for a fixed number of times. In fact, looping based upon the value of a counter is the most common branching operation in digital signal processors. As a result, many DSP ps have dedicated instructions to reduce any computational penalty in managing a loop count. For example, DSP processors normally support an instruction that causes the next machine instruction to be repeated a fixed number of times. As a consequence of this, a justification for dedicating substantial resources to a branch-target cache cannot be found. Branch-target caching makes more sense in general-purpose applications since many of these applications have branching patterns that are difficult to predict at compile-time. Most integer digital signal processors are actually fixed-point arithmetic machines. The fixed-point format is achieved by integrating shifters with the multiplier-accumulator so as to allow pipelined adjustment of operands and results. The multipliers and accumulators included in most fixed-point digital signal processors are oversized or extended precision to allow transient computations to exceed the normal word-width of the processor. Exposed pipelines are usually avoided, however, in the quest for higher performance at lower unit cost. However, some processors (such as the TMS320C50) have switched to exposed pipelines. Exposed pipelines present some challenging programming issues that can be exasperating given how applications may require the programmer to reach more deeply into pipelines. Since digital signal processors are designed to support the real-time processing of large quantities of sampled data, they generally have support for enhanced dataflow. Modified or enhanced Harvard architectures are often needed to interface with on-board memories. Some digital signal processors include DMA controllers that are capable of performing memory-memory and memory-I/O move operations concurrent with computational tasks. An independent DMA controller would typically be used to load new data into the on-chip memory while some computation is performed. This allows an internal Harvard architecture to be better exploited by keeping the processor busy with computation rather than programmed data I/O. Currently, these DMA resources are managed explicitly by the programmer. In order to support rapid code development and portability, it is important that the management of the DMA resources be simplified, at least, if not moved completely into the programming tools.
16.8 DSP PROCESSOR PARALLELISM As VLSI technology has improved, it has become possible to include additional hardware resources to enhance the performance of general-purpose and application-specific processors. In order to increase throughput in a traditional Von Neumann machine, additional
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hardware resources are added to exploit opportunities for instruction-level parallelism. The techniques that have been developed to exploit opportunities for instruction-level parallelism are super-pipelining, superscalar architecture, dataflow processors, and very long instruction word architecture. Since software development costs have spiraled upwards, a significant effort has been focused in the area of automatic compiler-based optimization of high-level language code. The technique of super-pipelining has been exploited by some processors, such as the Intel Pentium Pro, in order to achieve high throughput. Super-pipelining is attained by adding pipeline stages so as to achieve a very short machine cycle, thus allowing a high issue rate. While instructions are issued sequentially at a high rate, they take many cycles to complete. So while one instruction is started, several or many previous instructions may be in various stages of completion. The disadvantage of super-pipelining is that it increases latency (the time from when an instruction is issued to when it is completed) and makes pipeline flushes more expensive. From a hardware perspective, the addition of pipeline registers requires significant extra hardware resources. In order to hide the pipeline from the programmer and/or compiler, the processor must keep track of resources that have been committed to instructions that are in progress in the pipeline. If resource conflicts occur, the pipeline is stalled, and “bubbles” are introduced into the pipeline. Instructions are generally ordered by the compiler or programmer to avoid pipeline stalling whenever possible. From a commercial viewpoint, attempts at parallelism for digital signal processing have relied upon expensive multiprocessor communications or alternatively multiple independently programmed ALUs. Unfortunately, these solutions carry a high price tag and can become I/O pin-bound. The newer high-end DSP ps combine an RISC processor with multiple ALUs under independent program control. The ALUs are optimized for signal- or image-processing operations, and the device is optimized for specific market segments quantified in terms of speed, cost, and power dissipation. One must also be mindful that DSP algorithms developed for uniprocessors do not necessarily translate well to a multiprocessor environment.
16.9 FIXED-POINT VERSUS FLOATING-POINT Choosing whether to implement a design in fixed-point, block floating-point, or floatingpoint can lead to tension between the various stakeholders in the design outcome. Consider the comparison presented in Table 16-2 that compares fixed- and floating-point solutions. Block floating-point solutions fall in between fixed- and floating-point. While strong arguments can be made to support either path, it nevertheless remains a fact that fixed-point solutions are, by far, the predominant DSP technology of the day.
16.10 DSP BENCHMARKS Technologists often presume that MIPS and MFLOPS are the standard measure of a DSP processor’s capability. A more important predictor is the device’s millions of multiplyaccumulates per second (MAC/s) rate. Potentially the most important tool used to classify and differentiate DSP technologies is the benchmark. A good benchmark is intended to isolate a particular device feature or function, and exercise the feature rigorously. There are, however, no standard sets of benchmarks that are universally accepted. A valid benchmark can, however, provide insights into a technology’s capabilities measured in terms of cycle
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TABLE 16-2 Floating-Point Fixed-Point Comparison
Item
Floating-point (e.g., TI TMS320C67)
Fixed-Point (e.g., TI TMS320C64)
Precision
Best—Has virtually unlimited precision. Eliminates the possibility of runtime overflow or other finite wordlength effects.
Worst—16-bit or higher precision, both limited in dynamic range and computational precision giving rise to finite wordlength effects.
Speed
Worst—Due to the complexity of floating-point, and possibly long pipeline delays.
Best—Simple arithmetic data flow and potentially high clock rates.
Cost
Worst—Potentially high hardware cost.
Best—Available in a wide range of cost-performance modalities.
Power dissipation
Worst—Can exhibit high power consumption.
Best—Range of power choices. Some have been specifically designed for low-power mobile and handheld operation.
Arithmetic Execution Latency
Worst—Floating point add has data-dependent delays which can be managed, to a degree, using a highly pipelined arithmetic system architecture.
Best—Simple arithmetic system design providing opportunities to develop efficient real-time execution code.
Time-to-market
Best—Faster due primarily to side-stepping finite wordlength concerns.
Worst—Managing finite wordlength effects can require additional analysis and testing.
count, memory use, execution time, energy consumption, and cost performance. Elements of common DSP benchmarks are • • • • • • • • • • • • • • •
Real FIR Complex FIR Single step real FIR Circular block FIR Single step adaptive FIR Single step real IIR Block IIR (biquad) Cascaded block IIRs Linear convolution Autocorrelation Vector add Vector product Maximum element in an array Complex FFT radix-4 Complex FFT radix-2
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• Inverse complex FFT radix-2 • Viterbi decoder • Bit manipulation
16.11 ADC/DAC OPERATION Analog to digital (ADC) and digital to analog (DAC) conversion are core DSP technologies (see Section 12.11). They often set the performance and precision bounds on a DSP system design. Figure 12-7 establishes that an ADC operation is actually performed by two distinct operations, namely an ideal sampler (sample-and-hold) and a quantizer. An n-bit quantizer converts the sample and hold circuit’s output value into one of 2n discrete values. In reality, the internal details of an ADC can differ. Each instance represents a different ADC architecture. The more common architectures are summarized in this section.
Delta-Sigma ADC A delta-sigma () converter combines over-sampling with subtractive feedback control, as shown in Figure 16-4. A converter can be of high-precision if the signal to be converted has a low bandwidth relative to the sample rate. As the “delta” () implies, a ADC relies on representing a signal with small differential amplitude changes. Using oversampling, the difference between adjacent samples of a band-limited signal can be guaranteed to be small. The analog front-end of a ADC contains a number of low-resolution components that can quantify these small changes. The back-end processor includes a feedback path that is used to synthesize small differential corrections V to the previous estimate x’(t) of value of x(t). Since the ADC is operating at a high over-sample rate, it is assumed that only small changes in x(t) could occur on an inter-sample basis. The ADC will continue to make small adjustments in the estimate of x’(t) based on the measure error (t) x(t) x’(t). There is, however, a fundamental caveat associated with ADCs. Initially, the error (t) is normally large, causing the ADC to take maximum corrective action (that is, administer a long series of small incremental changes). This is called the adaptation phase. Once adaptation takes place, the error approaches zero and the small corrective changes are applied selectively. In this context, is should be evident that the signal being converted should be smooth (in other words, small differential changes between samples). If noise or high-frequency signal components are present, an ADC can exhibit erratic behavior. Flash ADC. A flash converter consists of a collection of dedicated analog comparators and multilevel threshold detectors, as suggested in Figure 16-5. An n-bit flash converter
FIGURE 16-4
A ADC architecture.
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FIGURE 16-5 Flash ADC architecture.
incorporates 2n dedicated analog comparators. While being the fastest ADC architecture, flash converters consume a great deal of power and are of low word width. Successive Approximation ADC. Successive approximation converters are popular for mid-range applications. A successive approximation ADC is shown in Figure 16-6 and consists of a successive-approximation-register (SAR), comparators, and DACs. The SAR produces a monotonically increasing binary valued sequence (ramp). The digital ramp is converted into a discrete-time (analog) ramp using a DAC. The monotonic sequence continues to increase until a threshold is passed, based on the zero-crossing outcome. The time required to detect this sign-change is directly correlated to the ADC digital output. The speed of a successive approximation ADC is directly linked to the converter’s word width. Subrange ADC. Subrange converters subdivide a signal’s dynamic range into smaller units as suggested in Figure 16-7. The M most-significant-bits (MSBs) are obtained by a direct conversion by an M-bit ADC, with the others following in successive order. For a two-stage N-bit subrange ADC, the M most-significant-bits would be followed by the final (N-M) bits. The advantage of this method is that compared to a flash converter, a subrange
FIGURE 16-6
A successive approximation ADC architecture.
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FIGURE 16-7
Subrange ADC architecture.
converter enjoys a significant complexity reduction. However, multiple stages increase the conversion latency and compound the sample-and-hold circuit requirements. Pipelined ADC. Pipelined ADCs distribute the conversion process over multiple stages using collections of short wordlength ADCs and DACs, as shown in Figure 16-8. Each stage consists of one ADC synchronized to the succeeding ADC. A pipelined ADC requires sample and hold circuits, quantizers, and DACs for all but the last stage. Folded ADC. A folding or interpolating ADC employs a number of “folding blocks,” as suggested in Figure 16-9. The coarse converters produce the most significant bits of the folded circuit output. The least significant bits are defined by a modulo(V) rule. Interpolation is used to reduce the number of folding blocks required to achieve a given precision. A folding block contains N-coupled differential pairs whose output is directly converted by an Nbit ADC. Without interpolation, the folded ADC has the same complexity as a flash ADC. The following example illustrates the behavior of a typical converter. Example 16-1 Delta-Sigma () ADC Required:
A delta-sigma () ADC operates at a sample rate fs and consists of the elements shown in Figure 16-10. They are • Differencer: (t) x(t) x’(t) • Integrator: i(t) 1 ( (t)) dt • 1-bit ADC: xs[k] sign(i(t))
FIGURE 16-8
Pipelined ADC architecture.
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FIGURE 16-9
675
Folded ADC architecture.
• 1-bit DAC: x’(t) Vref xs[k] Vref • Digital low-pass filter: xs[k] S xr[k] • Decimator: Down-sample by M [decimation] The input signal x(t) arrives and is differenced with a synthesized signal x’(t) to form an error signal (t) x(t) x’(t) x(t). The difference signal (t) is then passed through a finite aperture analog integrator that smoothes the error signal, producing what represents the average value of (t) over a sliding interval of time. In practice, the smoothing is performed by a “leaky” analog integrator. A so-called 1-bit ADC, running at an accelerated rate of Mfs, produces an output that can only change V (that is, the least significant bit (LSB) value) between samples. In other words, the estimate x’(t) is allowed to change only by an amount V from sample to sample. The averaged error signal provides the feedback information that will cause the error to converge towards zero. Once convergence has occurred, the system will simply “toggle” the LSB to maintain convergence. Finally, it should be noted that the over-sample rate, Mfs, is returned to its original value fs using a process called decimation. Suppose, for illustrative purposes, that the ADC input is a constant x(t) 8 and V 1. Assume that the integrator is modeled as a moving average FIR having an impulse response h[k] (1/4)[1, 1, 1, 1]. Assume further that the output digital lowpass filter is an accumulator. Determine the response of the ADC starting from an original at-rest state. Results:
The response of the ADC is traced in Table 16-3. It can be noted that initially a large error is present (acquisition phase), which is reduced by the feedback loop. When converged, only small errors are present, requiring simple V corrections, as shown in Figure 16-11.
FIGURE 16-10
ADC architecture.
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TABLE 16-3 A ADC Example
Sample k
Input x(t)
(t) x(t) – x’(t)
i(t)
xs[k]
x’(t)
0 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 ...
8 8 8 8 8 8 8 8 8 8 8 8 8 8 8 8 8 8 ...
8 (initial) 8 7 6 5 4 3 2 1 0 1 2 1 0 1 2 1 0 ...
0 (initial) 8/4 2 15/4 3.75 21/4 5.25 26/4 6.5 22/4 5.5 18/4 4.5 14/4 3.5 10/4 2.5 6/4 1.5 2/4 0.5 24 –0.5 44 –1 44 –1 24 –0.5 24 0.5 44 1 44 1 ...
0 (initial) 1 1 1 1 1 1 1 1 1 1 0 0 0 0 1 1 1 ...
0 (initial) 1 2 3 4 5 6 7 8 9 10 9 8 7 6 7 8 9 ...
The next example illustrates issues associated with designing a multiplexed ADC system. Example 16-2 Multiplexed ADC System Required:
Consider the application illustrated in Figure 16-12. The ADC solution requires 16-bits of resolution over four independent signals, each signal having bandwidths bounded by 15 kHz, 15 kHz, 15 kHz, and 45 kHz, respectively. What is the minimum sample rate that will meet Shannon’s sampling criterion.
FIGURE 16-11
ADC acquisition and convergence.
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FIGURE 16-12
A multiplexed multichannel ADC system.
Results:
Consider sequencing the multiplexer to output an interleaved time-series { . . . , x4[kTs], x1[(k 1)Ts], x4[(k 2)Ts], x2[(k 3)Ts], x4[(k 4)Ts], x3[(k 5)Ts]. The signal x4(t) is polled three times more often than x1(t), x2(t), and x3(t). The signal x4(t) needs to be sampled at a Nyquist frequency of 90 kHz or higher. Since only 1@2 the samples are of x4(t), the multiplexed sample rate needs to be 180 kSa/s, or higher. The next example compares ADC performance based on the type of converted employed. Example 16-3 ADC Type Selection Required:
A multichannel problem is considered in Example 16-2. The system is to operate at a 180 k Sa/s rate, and is to be implemented using a successive approximation Analog Device AD974 ADC and/or a delta-sigma () Analog Device AD7722. Both ADCs can operate at sample rates above 180 k Sa/s. Discuss the design options and choices. Results:
The ADC requirements are summarized in Table 16-4. The SAR ADC accepts each sample as a discrete event, immediately converting the sample into a digital word. Unfortunately, the converter needs to acquire and track an analog signal (acquisition), and produces a reliable output only after convergence. When multiple signals are presented to a ADC, the converter is perpetually in an acquisition mode. As a result, four dedicated ADCs are needed to meet the data conversion requirement which can be satisfied with one SAR converter.
TABLE 16-4 Analog Device’s Candidate ADCs Converter
Architecture
Rated Throughput
Required # of Converters
AD974 AD7722
Successive Approximation Delta-Sigma ()
200 ksps 195 ksps
1 4
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16.12 ADC METRICS Digital data acquisition and conversion systems are found in virtually every modern communication system, DSP solution, electronic instrument, and micro-controller application. As a technology, data conversion systems are evolving at a slow rate compared to mainstream semiconductors. Two data acquisition parameters that are considered key to many applications are speed and precision. For mobile and untethered applications, a third parameter, power dissipation, is equally important. An n-bit ADC is assumed to map an analog sample into an equivalent digital word having a sign bit ( ), I integer bits, and F fractional bits, where n I F 1. The output of an ADC is quantized into 2n possible levels, with each level separated by a quantization step-size Q 2F. Roundoff errors are assumed to be a uniformly distributed random process having zero mean and variance s2 Q2/12. The error variance can also be expressed in bits as: ln2(s) ln2(Q/!12) ln2(2F ) ln2(!12) F 1.79 bits
(16-2)
The next example demonstrates the process of quantifying fixed point wordlength effects and errors. Example 16-4 ADC Parameters Required:
Assume that an analog signal x(t), bounded between A v, is mapped to a digital word with an n-bit ADC. The quantized signal is given by xD[k] Q < x(kTs)/ = # ] Q < xs[k]/= # , where is the quantization step size given by 2A/2n, Q